ABBASI, Sarwer J.

1. Matrix near-rings and generalized distributivity. Diss. Univ. Edinburgh, Scotland, 1989. M', T, D', I', X
2. Maximal left ideals and idealizers in matrix near-rings. in: Contrib. Gen. Alg. 8. (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 1--4. M', E
3. On matrix near-rings II. Riazi, J. of Karachi Math. Ass. 14 (1992). M'
4. Distributively generated matrix near-rings. Preprint ICTP, Trieste, Italy, 1993. M', D
5. Primitivity and weak distributivity in near-rings and matrix near-rings. submitted. M', P, D, D'
6. Matrix near-rings and pseudo distributivity. submitted. M', D'

See also ABBASI-MELDRUM, ABBASI-MELDRUM-MEYER

ABBASI, S. J., and MELDRUM, John D. P.

1. On matrix near-rings. Math. Pannonica 2/2 (1991), 95--101. MR 93a:16035 M', T, D', I', X

ABBASI, S. J., MELDRUM, John D. P., and MEYER, Johannes Hendrik

1. The $J_0$-radicals of matrix near-rings. Arch. Math. 56 (1991), 137--139. MR 92a:16049 M', R, T, X
2. Ideals in near-rings and matrix near-rings. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 3--14. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. M', R, T, X

ABOU-ZAID, Salah

1. On fuzzy subnear-rings and ideals. Fuzzy Sets and Systems 44 (1991), 139--146. MR 92k:16012 E, X, T, Rs, Po

ABUJABAL, Hamza A. S.

1. Commutativity and decomposition for near rings. Tamkang J. Math. 28 (1997), no. 2, 119--125.

See also ABUJABAL-KHAN-OBAID

ABUJABAL, H. A. S., KHAN, M. A., and OBAID, M. A.

1. On structure and commutativity of near-rings. Proyecciones 19 (2000), no. 2, 113--124.

ADAMS, William B.

1. Near integral domains and fixed-point-free automorphisms. Doctoral Diss., Boston Univ., 1975, Boston, Mass., USA A, I
2. Near-integral domains on non-abelian groups. Monatsh. Math. 81 (1976), 177--183. MR 54:2731 A, I
3. Near-integral domains on finite abelian groups. manuscript. A, I

ADHIKARI, M. R.

See ADHIKARI-DAS

ADHIKARI, M. R., and DAS, Pratyayananda

1. An algebraic and fuzzy algebraic approach to vector bundles. Bull. Calcutta Math. Soc. 89 (1997), no. 1, 29--36. MR 99d:55009

ADLER, Irving

1. Composition rings. Duke Math. J. 29 (1962), 607--625. Cr, H, A, E', S, T, T', E

AHMED, Mosleh U.

1. A theorem on continuous transformation near-rings. Chittagong Univ. Stud. Part II Sci. 10 (1986), no. 1-2, 49--51. MR 89k:16065 T, T'
2. Some ideals in continuous transformation nearrings. Chittagong Univ. Stud. Part II Sci 13 (1989), no. 1, 19--21. T, T'

AHSAN, Javed

1. On regular near-ring modules. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 45--52. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). MR 96j:16051
2. Seminear-rings characterized by their $S$-ideals, I. Proc. Japan Acad. Ser A Math. Sci. 71 (1995), 101--103. MR 96i:16067 Rs, E
3. Seminear-rings characterized by their $S$-ideals, II. Proc. Japan Acad. Ser A Math. Sci. 71 (1995), 111--113. MR 96i:16068 Rs, E

See also AHSAN-LIU, AHSAN-MASON

AHSAN, Javed, and LIU, Zhongkui

1. Inbedding an arbitrary near-ring or a semiring in a nontrivial seminear-ring. submitted. Rs, E'
2. Strongly idempotent seminearrings and their prime ideal spaces. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 151--166. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997). MR 98k:16064

AHSAN, J., and MASON, G.

1. Fully idempotent near-rings and sheaf representations. Int'l J. Math. Math. Sci. 21 (1998), 145--152. MR 98m:16054

AICHINGER, Erhard

1. Interpolation with near-rings of polynomial functions. Thesis, University of Linz, Austria (1994). P,Po,T
2. Local interpolation near-rings as a frame-work for the density theorem. Contributions to General Algebra 9, 27--36. Verlag H\"{o}lder-Pichler-Tempsky, Wien - Verlag B. G. Teubner, Stuttgart, 1995. MR 98h:16072 P, T, Po
3. Planar rings. Results in Mathematics 30 (1996), 10--15. MR 97h:16060 P"
4. A note on simple composition rings. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 167--174. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
5. Local polynomial functions on the integers. Riv. Mat. Univ. Parma (5) 6 (1997), 169--177. Po
6. The structure of composition algebras. Ph.D. thesis, Division of Algebra, Johannes Kepler University Linz, June 1998. Cr,P
7. On maximal ideals of tame near-rings. Riv. Mat. Univ. Parma (6) 2* (1999), 215--233. L,E,E"
8. On near-ring idempotents and polynomials on direct products of {$\Omega $}-groups. Proc. Edinburgh Math. Soc. (2), to appear. Po

See also AICHINGER-BINDER-ECKER-EGGETSBERGER-N\"{O}BAUER-MAYR, AICHINGER-BINDER-ECKER-N\"{O}BAUER-MAYR, AICHINGER-ECKER-N\"{O}BAUER, AICHINGER-IDZIAK, AICHINGER-N\"{O}BAUER

AICHINGER, E., BINDER, F., ECKER, J., EGGETSBERGER, R., N\"{O}BAUER, C., and MAYR, P.

1. SONATA---a system of near-rings and their applications. Near-ring newsletter \#17, 1998. C'
2. 9 easy pieces for SONATA (Tutorial). Near-ring newsletter \#17, 1998. C'

AICHINGER, E., BINDER, F., ECKER, J., N\"{O}BAUER, C., and MAYR, P.

1. Algorithms for Near-rings of Non-linear Transformations. Proc. of the ISSAC 2000, pp. 23--29 (ACM 2000), St. Andrews, Scotland.

AICHINGER, E., ECKER, J., and N\"{O}BAUER, C.

1. The use of computers in near-ring theory. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 35--41. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

AICHINGER, E., and IDZIAK, Pawel M.

1. Affine complete Omega-groups. manuscript. Ua,Po,Rs

AICHINGER, E., and N\"{O}BAUER, C.

1. The cardinalities of the endomorphism near-rings $I(G)$, $A(G)$, and $E(G)$ for all groups $G$ with $|G|\leq 31$. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 175--178. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).

AJUPOV, \v{S}. A.

1. Topology of $C$-convergence in semifields. (Russian). Izv. Akad. Nauk UzSSR Ser. Fiz.-Mat. Nauk 1976, no. 5, 3--7, 83.

AIJAZ, Kulsoom

See AIJAZ-HUQ

AIJAZ, Kulsoom, and HUQ, S. A.

1. Categorical investigation of $\Gamma $-graded $\Lambda $-algebras. Portugaliae Math. 28 (1969), 21--36. H

AL-ASSAF, A. A. M.

1. A characterization theorem for left zero absorbing seminear-rings. submitted. Rs

ALBRECHT, Ulrich

See ALBRECHT-HAUSEN

ALBRECHT, Ulrich, and HAUSEN, Jutta

1. Nonsingular modules and $R$-homogeneous maps. Proc. Amer. Math. Soc. 123 (1995), no. 8, 2381--2389. MR 95j:16026

AL HAJRI, N. A., and MAHMOOD, Suraiya J.

1. D. g. near-rings on the generalized quaternion groups. Riazi, J. Karachi Math. Assoc. 15 (1993), 43--65. D, F'

ALI, Asma

See ALI-ASHRAF-QUADRI

ALI, Asma, ASHRAF, Mohd., and QUADRI, Murtaza A.

1. On the structure of certain periodic near-rings. Acta Sci. Natur. Univ. Jilin (1994), 17--20. MR 96f:16056
2. Some elementary commutativity conditions for nearrings. Math. Student 56 (1988), 181--183. MR 90h:16057 B
3. Certain conditions under which nearrings are rings. Bull. Austral. Math. Soc. 42 (1990), no. 1, 91--94. MR 91g:16037 D, B
4. Structure of certain near-rings. Rend. Istit. Mat. Univ. Treste 24 (1992), 161--167. MR 95k:16065
5. Certain conditions under which nearrings are rings II. Rad. Mat. 8 (1992/98), 311--319.

ALLEVI, E.

1. Subdirect products of commutative $(+, \cdot )$-bends and distributive near-rings. Istit. Lombardo Accad. Sci. Lett. Rend. A 121 (1987), 41--53. MR 90e:16067 _D, Rs

ALONSO, Cesar

See ALONSO-GUTI\'{E}RREZ-RECIO

ALONSO, Cesar, GUTI\'{E}RREZ, Jaime G., and RECIO, Tomas

1. A rational function decomposition algorithm by near-separated polynomials. J. Symbolic Comput. 19 (1995), 527--544. Po, X

ANDERSON, T.

See ANDERSON-KAARLI-WIEGANDT

ANDERSON, T., KAARLI, K., and WIEGANDT, R.

1. Radicals and subdirect decomposition. Commun. Alg. 13 (1985), 479--494. R, S, N, C
2. On left strong radicals of near-rings. Proc. Edinb. Math. Soc. 31 (1988), 447--456. MR 89i:16032 R, Ua, P

ANDR\'{E}, Johannes

1. Projektive Ebenen \"{u}ber Fastk\"{o}rpern. Math. Z. 62 (1955), 137--160. MR 17:73 F, G, Rs
2. \"{U}ber eine Beziehung zwischen Zentrum und Kern endlicher Fastk\"{o}rper. Arch. Math. 14 (1963), 145--146. MR 27:1528 F
3. Lineare Algebra \"{u}ber Fastk\"{o}rpern. Math. Z. 136 (1974), 295--313. F, P'', X
4. Affine Geometrien \"{u}ber Fastk\"{o}rpern. Mitteilungen aus dem Mathem. Seminar Gie\OT1\ss en 114 (1975), 1--99. MR 58:2588 F, G
5. Bemerkungen \"{u}ber Fastvektorr\"{a}ume. FU-Berlin, Lenz-Festband (1976), 28--36. F, G, X
6. Some topics on linear algebra over near-fields. Oberwolfach 1976. F, P'', X
7. Non-commutative geometry, near-rings, and near-fields. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 1--14. G, F, P''
8. On finite noncommutative spaces over certain nearrings. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 5--14.
9. Noncommutative geometry and generalized Hughes planes. (German). Math. Z. 177 (1981), no. 4, 449--462. MR 83i:51007a
10. On the closure of parallelograms and dimensions in noncommutative affine spaces. (German). Mitt. Math. Sem. Giessen No. 149 (1981), 77--83. MR 83i:51007b

See also ANDR\'{E}-NEY

ANDR\'{E}, Johannes, and NEY, Hans

1. On Anshel-Clay-Nearrings. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 15--20. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995.

ANGERER, Josef

1. Radikale kleiner Fastringe. Diss. Univ. Linz, 1978. R, A, P', N, Q, D, _D, F, P'', A', R', C, I'

See also ANGERER-PILZ

ANGERER, Josef, and PILZ, G\"{u}nter

1. The structure of near-rings of small order. Lecture Notes in Computer Science No. 144 (Computer Algebra, Marseille 1982), Springer-Verlag (1982), 57--64. MR 84b:16041 R, A, P, C, M

ANSHEL, Michael

See ANSHEL-CLAY

ANSHEL, Michael, and CLAY, James R.

1. Planarity in algebraic systems. Bull. Amer. Math. Soc. 74 (1968), 746--748. MR 37:1415 P'', G, I', A, E
2. Planar algebraic systems. some geometric interpretations, J. Algebra 10 (1968), 166--173. MR 39:2813 P'', G, I', A,

ANTONOVSKI\u{i}, M. Ja.

See ANTONOVSKI\u{i}-AZIMOV

ANTONOVSKI\u{i}, M. Ja., and AZIMOV, D.

1. Decompositions of the Boolean algebra of idempotents, and the corresponding class of subsemifields. (Russian). Dokl. Akad. Nauk UzSSR 1969, no. 11, 3--4.

ARGAC\c{C}, Nurcan

1. On Prime and semi-prime nearrings with derivations. Int. J. Math. Math. Sci. 20 (1997), 737--740.

See also ARGAC\c{C}-BELL

ARGAC\c{C}, Nurcan, and BELL, Howard E.

1. Some results on derivations in nearrings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 42--46. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

ARMENTROUT, Nancy

1. On near-rings associated with generalized affine planes. M. A. Thesis, Texas A\&M 1971. G, L

See also ARMENTROUT-HARDY-MAXSON

ARMENTROUT, Nancy, HARDY, F. Lane, and MAXSON, Carlton J.

1. On generalized affine planes. J. Geometry 1 (1974), 143--159. MR 51:4031 G, L

ASHRAF, Mohammad

1. On structure and commutativity of certain periodic near rings. Results Math. 24 (1993), 201--210.
2. Structure of certain periodic rings and near-rings. Rend. Sem. Mat. Univ. Politec Torino 24 (1992), 161--167. MR 95k:16065

See also ALI-ASHRAF-QUADRI, ASHRAF-JACOB-QUADRI

ASHRAF, M., JACOB, V. W., and QUADRI, M. A.

1. Certain periodic near rings are rings. Aligarh Bull. Math. 14 (1992/93), 9--13.
2. On structure of certain periodic near-rings. Acta Sci. Natur. Univ. Jilin. 1994, no. 3, 17--20. MR 96f:16056

AUFREITER, Richard

1. A new data encryption algorithm based on affine planes generated from planar near-rings. Thesis, Univ. Linz, Austria, 1994.

AYARAGARNCHANAKUL, J.

See AYARAGARNCHANAKUL-MITCHELL

AYARAGARNCHANAKUL, J., and MITCHELL, S. Division

1. Seminear-rings. Kyungpook Math. J. 34 (1994), no. 1, 67--72.

AZIMOV, D.

See ANTONOVSKI\u{i}-AZIMOV

BACHMANN, Otto

1. \"{U}ber die Unterr\"{a}ume von Fastvektorr\"{a}umen. manuscript. F, X

Bader, L.

1. On generalized Andr\'{e} planes. (Italian) Rend. Circ. Mat. Palermo (2) 35 (1986), no. 3, 448--455 (1987). MR 89e:51012

BAE, Chul Kon

See BAE-PARK

BAE, Chul Kon, and PARK, June Won

1. Some characterizations of near-fields. Math. Japon. 34 (1989), 847--849. MR 90i:16030 F, E
2. Some characterizations of near-fields. II, Mem. Fac. Sci. Kuyushu Univ. 44 (1990), 89--93. MR 91i:16076 F, E, S

BAER, Reinhold

1. Inverses and zero-divisors. Bull. Amer. Math. Soc. 48 (1942), 630--638. _D

BAGLEY, Scott William

1. Polynomial near-rings, distributor and $J_2$-ideals of a generalized centralizer near-ring. Diss. Texas A\&M Univ., College Station, Tx, 1993. MR 98i:16046 Po, T, D', R, S, P'
2. Does R prime imply $M_R(R^2)$ is simple? ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 53--56. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). MR 96k:16081
3. Polynomial near-rings: Polynomials with coefficients from a near-ring. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 179--190. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
4. Distributor and $J_2$ radical ideals of generalized centralizer near-rings. Comm. Algebra 25 (1997), 3405--3425. MR 98f:16031

BALAKRISHNAN, R.

See BALAKRISHNAN-SURYANARAYANAN

BALAKRISHNAN, R., and SURYANARAYANAN, S.

1. A near-ring $\protect \relax N$ in which every $\protect \relax N$-subgroup is invariant. Math. Ed. (Siwan) 33 (1999), no. 3, 129--135.

BANASCHEWSKI, Bernhard

See BANASCHEWSKI-NELSON

BANASCHEWSKI, Bernhard, and NELSON, Evelyn

1. On the non-existence of injective near-ring modules. Canad. Math. Bull. 20 (1977), 17--33. MR 57:12612 D, H

BASILE, Alessandro

See BASILE-BRUTTI

BASILE, Alessandro, and BRUTTI, Paolo

1. Fibrations of a class of regular near-fields of dimension $t+1$ over the kernel. (Italian) Rend. Circ. Mat. Palermo (2) 31 (1982), no. 3, 415--420. MR 84m:51016

BASKARAN, S.

1. Remarks on a paper of S. Ligh's (Monatsh. Math. 76 (1972), 317--322), Math. Student 42 (1974), 351--352. MR 53:8153 I', A

BEAUMONT, Ross A.

1. Generalized rings. Proc. Amer. Math. Soc. 9 (1958), 876--880. Rs, E

BEHBOUD, Ali

1. Ultraproducts of near-fields as residue class constructions. (German). Result. Math. 11(1987), 193--197. MR 88g:03050 F, C
2. Planar abgeschlossene Theorien von Fastk\"{o}rpern. Diss., Univ. Hamburg, 1989. F, G, P'', X, D''
3. Universally axiomatizable classes of nearfields. (German). Results in Math. 17 (1990), 52--58. MR 91a:12012 F, D'', X
4. Planare Abgeschlossenheit von Dicksonschen Fastk\"{o}rpern und die Tiefe von Gruppenkopplungen. Abh. Math. Sem. Univ. Hamburg 61 (1991), 35--46. MR 92k:12006 F, D'', P'

BEIDAR, Kosita I.

See BEIDAR-FONG-KE, BEIDAR-FONG-KE-LIANG, BEIDAR-FONG-KE-WU, BEIDAR-FONG-WANG, BEIDAR-FONG-SHUM

BEIDAR, Kostia I., FONG, Yuen, and KE, Wen-Fong

1. On the simplicity of centralizer nearrings. Proc. First Tainan-Moscow Algebra Workshop, Tainan, 1994, (1996), 139--146, Springer-Verlag. MR 98c:16059
2. On finite circular planar nearrings. J. Algebra 85 (1996), 688--709. MR 97k:16060
3. Maximal right nearring of quotients and semigroup generalized polynomial identity. submitted.

BEIDAR, Kostia I., FONG, Yuen, KE, Wen-Fong, and LIANG, S. Y.

1. Nearring multiplications on groups. Comm. Algebra 23 (1995), 999--1015. MR 95k:16061

BEIDAR, Kostia I., FONG, Yuen, KE, Wen-Fong, and WU, W.-R.

1. On semi-endomorphisms of groups. Comm. Algebra 27 (1999), no. 5, 2193--2205. MR 2000f:16039

BEIDAR, Kostia I., FONG, Yuen, and SHUM, K. P.

1. On the hearts of subdirectly irreducible near-rings. SEA Bull. Math. 18 (1994), 5--9.

BEIDAR, Kostia I., FONG, Yuen, and WANG, X.-K.

1. Posner and Herstein theorems for derivations of $3$-prime near-rings. Comm. Algebra 24 (1996), 1581--1589. MR 97e:16093

BEIDLEMAN, James C.

1. On near-rings and near-ring modules. Doctoral Diss., Pennsylvania State University, 1964. E, D, E'', F, I, M, N, P, Q, R, S, X
2. Quasi-regularity in near-rings. Math. Z. 89 (1965), 224--229. MR 31:3464 Q, R, E, D, N
3. A radical for near-ring modules. Michigan Math. J. 12 (1965), 377--383. MR 32:2441 D, R, S, N
4. Distributively generated near-rings with descending chain condition. Math. Z. 91 (1966), 65--69. MR 32:2443 E, D, D''
5. On groups and their near-rings of functions. Amer. Math. Monthly 73 (1966), 981--983. MR 34:4374 T, E
6. Nonsemi-simple distributively generated near-rings with minimum condition. Math. Ann. 170 (1967), 206--213. MR 34:7587 D, N, I, R
7. Strictly prime distributively generated near-rings. Math. Z. 100 (1967), 97--105. MR 36:216 P', D, P, E'', M
8. On the theory of radicals in d. g. near-rings I. The primitive radical. Math. Ann. 173 (1967), 89--101. MR 36:1492A R, D, P, D', N, E
9. On the theory of radicals in d. g. near-rings II. The nil radical. Math. Ann. 173 (1967), 200--218. MR 36:1492B D, N, R, Q, E'
10. A note on regular near-rings. J. Indian Math. Soc. 33 (1969), 207--210. MR 42:6052 R', N, I, I', E', F'
11. On the additive group of a finite near-ring. Indian J. Math. 12 (1970), 95--106. MR 46:3576 A, D', D, P, R

See also BEIDLEMAN-COX

BEIDLEMAN, James C., and COX, Raymond H.

1. Topological near-rings. Arch. Math. (Basel) 18 (1967), 485--492. MR 37:2819 T', Q, R, N

BELL, Howard E.

1. Near-rings in which each element is a power of itself. Bull. Austral. Math. Soc. 2 (1970), 363--368. MR 41:8476 B, A, D, I', W, P'
2. Certain near-rings are rings. J. London Math. Soc. II Ser. 4 (1971), 264--270. MR 45:1979 B, D
3. Infinite subrings of infinite rings and near-rings. Pacific J. Math. 59 (1975), 345--358. MR 52:8197 D', X
4. Commutativity theorems for distributively generated near-rings. Oberwolfach 1976. B, I', D
5. Commutativity theorems for rings and near-rings: a brief survey. Oberwolfach 1976. B
6. A commutativity theorem for near-rings. Canad. J. Math. 20 (1977), 25--28. MR 56:3065 B, I', D
7. Some centres for near-rings. Conf. Edinbg., 1978. B, D, N
8. Centres for near-rings: applications to commutativity theorems. Proc. Edinb. Math. Soc. 23 (1980), 61--68. MR 82a:16034 B, D, N
9. On commutativity of periodic rings and near-rings. Acta Math. Acad. Sci. Hungaricae 36 (1980), 35--40. MR 82h:16026 B, D, N
10. On finiteness of near-rings. San Benedetto del Tronto, 1981, 133--134. X, B
11. Commutativity of near-rings and near-commutativity of rings. Conf. Near-Rings and Near-Fields, Harrisburg, Virginia, 1983, 2--4. B, E, X, D, I
12. On finiteness of near-rings. Publ. Math. Debrecen 31 (1984), 77--80. MR 85j:16053 E, X
13. Certain near-rings are rings II. Intern. J. Math. Math. Sci. 9 (1986), 267--272. MR 87m:16062 D, _D, B
14. On derivations in near-rings, II. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 191--198. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).

See also BELL-LIGH, BELL-MASON

BELL, Howard E., and LIGH, Steve

1. On finiteness conditions for near-rings. Publ. Math. Debrecen 22 (1975), 35--40. MR 53:550 D, W, E, X
2. Some decomposition theorem for periodic rings and near-rings. Math. J. Okayama Univ. 31 (1989), 93--99. MR 91i:16053 B

BELL, Howard E., and MASON, G.

1. On derivations in near-rings. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 31--36. MR 88e:16051 E, X
2. On derivations in near-rings and rings. Math. J. Okayama Univ. 34 (1992), 135--144. MR 95e:16043

BENINI, Anna

1. Sui quasi-anelli quasi-idempotenti. Boll. Un. Mat. Ital. (6) 5-A (1986), 235--242. MR 87i:16070 B, N, E
2. Sui pj-quasi-anelli. Riv. Mat. Univ. Parma 12 (1986), 143--146. MR 88k:16033 E, B, F
3. Sums of near-rings. Riv. Mat. Univ. Parma (4) 14 (1988), 135--141. MR 90e:16055 E, C
4. Near-rings on certain groups. Riv. Mat. Univ. Parma (4) 15 (1989), 149--158. MR 91i:16077 E, A
5. Near-rings whose one-sided non nil ideals are GP-near-fields. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 21--33. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. E, F, X

See also BENINI-PELLEGRINI, BENINI-MORINI, BENINI-MORINI-PELLEGRINI

BENINI, Anna, and MORINI, F.

1. Weakly divisible nearrings on the group of integers (mod $p^n$). Riv. Math. Univ. Parma (6) 1 (1998), 1--11. (1999). B,D'
2. 2. On the construction of a class of weakly divisible nearrings. Riv. Math. Univ. Parma (6) 1 (1998), 103-111. (1999).

BENINI, Anna, MORINI, F., and PELLEGRINI, Silvia

1. Weakly divisible nearrings: genesis, construction and their links with designs. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 47--71. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

BENINI, Anna, and PELLEGRINI, Silvia

1. Medial and permutable near-rings. Riv. Mat. Univ. Parma (4) 16 (1990), 119--130. MR 92c:16040 E, B, X, P'
2. Near-rings with left and right self distributive multiplication. PU. M. A. Ser. A. MR 92a:16050 E, B, X
3. Invariant series in universal algebras, $\Omega $-groups and near-rings. Contributions to General Algebra 7 (Wien 1990). MR 92j:08003 E, Ua
4. w-Jordan near-rings I. Math. Pann. 3 (1992), 97--106. MR 94j:16077 R, S, N, E
5. w-Jordan near-rings II. Math. Pann. 5 (1994), 79--89. MR 95e:16044 P, P', S, N, E
6. Near-rings on certain groups. Riv. Mat. Univ. Parma, (Ser. 15) IV (1989), 149--158.
7. Errata to: ``Near-rings with left and right self distributive multiplication,'' Pure Math. Appl. Ser. A 1 (1991), no. 3--4, 257.
8. Weakly divisible nearrings. Combinatorics (Assisi, 1996). Discrete Math. 208/209 (1999), 49--59. MR 2001a:16073 B,D'

BENZ, Walter

1. Vorlesungen \"{u}ber Geometrie der Algebren. Springer Verlag, Berlin-Heidelberg-New York 1973. MR 50:5623 G, S''

BERMAN, Gerald

See BERMAN-SILVERMAN

BERMAN, Gerald, and SILVERMAN, Robert J.

1. Near-rings. Amer. Math. Monthly 66 (1959), 23--34. MR 20:6438 E, I, E'
2. Simplicity of near-rings of transformations. Proc. Amer. Math. Soc. 10 (1959), 456--459. MR 21:3467 T, S
3. Embedding of algebraic systems. Pacific J. Math. 10 (1960), 777--786. MR 22:11060 E', Ua

BETSCH, Gerhard

1. Fastringe. Zulassungsarbeit, 1959. E, F, D, S, R
2. Ein Radikal f\"{u}r Fastringe. Math. Z. 78 (1962), 86--90. MR 25:3068 R, P, S
3. Strukturs\"{a}tze f\"{u}r Fastringe. Diss. Univ. T\"{u}bingen, 1963. E, P, R, S, M, I, N, T
4. Ein Satz \"{u}ber 2-primitive Fastringe. Oberwolfach, 1968. P, T
5. Sheaf representation of near-rings. Oberwolfach, 1972. X
6. Primitive near-rings. Math. Z. 130 (1973), 351--361. MR 48:4053 P, T, E'
7. Some structure theorems on 2-primitive near-rings. Colloquia Mathematica Societatis Janus Bolyai 6, Rings, modules, and radicals, Keszthely, Hungary, 1971, North-Holland 1973, 73--102. MR 50:3169 P, T, I, D'
8. Near-rings of group mappings. Oberwolfach, 1976. T
9. Near-rings of group mappings. Edinburgh., 1978. T, I, P
10. Some results on near-rings of group mappings. Oberwolfach, 1980. T, E'', D', P
11. On 0-primitive near-rings. Proc. Conf. San Benedetto del Tronto, 1981, 3--12. P
12. Embedding of a near-ring into a near-ring with identity. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 37--40. MR 88c:16052 E'
13. Near-Rings and Near-Fields (ed.), North-Holland, Amsterdam 1987. MR 87m:16002 All from A to X
14. Near-rings and near-fields: Proceedings of a Conference held at the Math. Forschungsinstitut, Oberwolfach, 5--11 Nov., 1989 (editor), (1995). All from A to X
15. On the beginnings and development of near-ring theory. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 1--12. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).
16. Combinatorial aspects of nearring theory: To the memory of JAMES RAY CLAY. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 1--9. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

See also BETSCH-CLAY, BETSCH-KAARLI, BETSCH-WIEGANDT

BETSCH, Gerhard, and CLAY, James R.

1. Block designs from Frobenius groups and planar near-rings. Proc. Conf. Finite groups (Park City, Utah), Acad. Press 1976, 473--502. MR 53:5326 P''

BETSCH, Gerhard, and KAARLI, Kalle

1. Supernilpotent radicals and hereditariness of semisimple classes of near-rings. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 5. R, S
2. Supernilpotent radicals and hereditariness of semisimple classes of near-rings. in ``Radical Theory'' (Proc. Conf. Eger, 1982, Colloqu. Math. Soc. J. Bolyai), North-Holland, Amsterdam, 1985. MR 88f:16037 R, S

BETSCH, Gerhard, and WIEGANDT, Richard

1. Non-hereditary semisimple classes of near-rings. Studia Sci. Math. Hungar. 17 (1982), 69--75. MR 85m:16020 R, S

BHANDARI, Mahesh Chandra

See BHANDARI-RADHAKRISHNA, BHANDARI-SAXENA

BHANDARI, Mahesh Chandra, and RADHAKRISHNA, A.

1. On partially ordered near-rings. Math. Student 43 (1975), 113. O
2. On a class of lattice ordered near-rings. Indian J. Pure and Applied Math. Sciences 9 (1978), 581--587. MR 57:16359 O
3. On lattice ordered near-rings. Pure Appl. Math. Sci. 9 (1979), 1--6. MR 80d:16023 O
4. On radicals in lattice ordered near-rings. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 6--8. R, P, O

BHANDARI, Mahesh Chandra, and SAXENA, Pramod Kumar

1. Lower formation radicals of near-rings. Kyungpook Math. J. 18 (1978), 23--29. MR 58:11032 R
2. Lower and upper formation radicals of near-rings. Kyungpook Math. J. 19 (1979), 205--211. MR 81b:16028 R
3. A note on Levitsky radicals of near-rings. Kyungpook Math. J. 20 (1980), 183--188. R, N, E, D
4. General radical theory of near-rings. Tamkang J. of Math. 12 (1981), 91--97. MR 84j:16021 R
5. D-regularity of near-rings. Indian J. Pure Appl. Math. 12 (1981), 938--944. MR 83e:16045 Q, R, R'
6. Pseudoregularity for near-rings. Indian J. Pure Appl. Math. 13 (1982), 1409--1412. MR 84f:16040 Q, R', E
7. Pseudoregularity for near-rings. Alg. and its Appl. (New Delhi 1981), 277--281, Lecture Notes in Pure Appl. Math. 91, Dekker, New York 1984. MR 85j:16054 Q, R', E

Bhattarai, Hom Nath

1. On geometric nearfields. Nepali Math. Sci. Rep. 5 (1980), no. 2, 87--91. MR 83f:51022

BHAVANARI, Satyanarayana

1. Tertiary decomposition in noetherian N-groups. Comm. Alg. 10 (18) (1982), 1951--1963. MR 83k:16027 E, P'
2. A note on $\Gamma $-near-rings. Proc. Japan Acad. Ser. A Math. Sci. 59 (1983), 382--383. MR 85f:16050 X, P', R
3. Primary decomposition in Noetherian near-rings. Indian J. Pure and Appl. Math. 15 (1984), 127--130. MR 84m:16036 P', E
4. A radical for M$\Gamma $-modules. submitted. X, R
5. N-groups with finite Goldie dimension. J. Ramanujan Math. Soc. 5 (1990), no. 1, 61--75. MR 91i:16047 P', E
6. On modules with FSD and a property (<

   >), Proc. Conf. Math., Annemalai Univ., 1987. E, X

7. On modules with finite spanning dimension. Proc. Japan Acad. 61 (1985), 23--25. E, X
8. On finite spanning dimension in N-groups. Indian J. pure appl. Math. 22 (8) (1991), 633--636. MR 92f:16058 R, S, E
9. A note on $\Gamma $-near-rings. B. N. Prasad birth centenary commemoration volume. Indian J. Math. 41 (1999), no. 3, 427--433.
10. The f-Prime Radical in G-Nearrings. Southeast Asian Bulletin of Mathematics 23 (1999), 507--511.

See also BHAVANARI-GUNTUPALLI, BHAVANARI-KUNCHAM, BHAVANARI-MURTY, BHAVANARI-RAO, BHAVANARI-RAO-SYAM, BHAVANARI-REDDY, BHAVANARI-SYAM

BHAVANARI, Satyanarayana, and GUNTUPALLI, Koteswara Rao

1. On a class modules and $N$-groups. J. Indian Math. Soc. (N.S.) 59 (1993), no. 1-4, 39--44. MR 94k:16072

BHAVANARI, Satyanarayana, and KUNCHAM, Syam Prasad

1. A result on $E$-direct systems in $N$-groups. Indian J. Pure Appl. Math. 29 (1998), no. 3, 285--287.

BHAVANARI, Satyanarayana, and MURTY, C. V. L. N.

1. A note on completely semiprime ideals in near-rings. 48th Conf. Indian Math. Soc., Bhagalpur, Dec. 1982. P'

BHAVANARI, Satyanarayana, RAO, M. B. V. Lokeswara, and SYAM, Prasad K.

1. A note on primeness in near-rings and matrix near-rings. Indian J. pure appl. Math. 27 (3) (1996), 227--234.

BHAVANARI, Satyanarayana, and RAO, V. Sambasiva.

1. The prime radical in near-rings. Indian J. Pure Appl. Math. 15 (1984), 361--364. MR 85f:16048 P', R
2. On a class of modules and N-groups. J. Indian Math. Soc. (N.S.) 59 (1993), no. 1-4, 39--44. MR 94k:16072 P'

BHAVANARI, Satyanarayana, RAO, M. B. V., and SYAM, Prasad, K.

1. A note on primeness in near-rings and matrix near-rings. Ind. J. Pure Appl. Math. 27 (1996), 227--234.

BHAVANARI, Satyanarayana, and REDDY, Yenumula Venkatesvara

1. The f-prime radical in near-rings. Indian J. pure appl. Math. 17 (1986), 327--330. MR 87f:16033 P', N, R
2. A note on completely reducible near-rings. submitted. E
3. A note on modules. Proc. Japan Acad. 63 (1987), 208--211. E, X
4. A generalization of prime ideals in r-near-rings. Symp. Near-Rings and Appl., Nagarjuna, 1985. P'
5. Finite spanning dimension in $N$-groups. Math. Student 56 (1988), 75--80. E, X
6. A note on $N$-groups. Indian J. Pure Appl. Math. 19 (1988), no. 9, 842--845. MR 89m:16080 E, X

and BHAVANARI, Satyanarayana, SYAM, Prasad Kuncham

1. A Result on E-direct Systems in N-Groups. Indian J. pure appl. Math. 29 (1998), 285--287. E, X

BHOPATKAR, N.

See BHOPATKAR-CHOUDHARY-TEWARI

BHOPATKAR, N., CHOUDHARY, S. C., and TEWARI, K.

1. Strictly semisimple near-rings. Notices AMS, October 1972.

BILIOTTI, Mauro

1. A Dembowski generalisation of the Hughes planes. (Italian) Boll. Un. Mat. Ital. B (5) 16 (1979), no. 2, 674--693. MR 84d:51024

BINDER, Franz

See AICHINGER-BINDER-ECKER-EGGETSBERGER-N\"{O}BAUER-MAYR, AICHINGER-BINDER-ECKER-N\"{O}BAUER-MAYR

BINDEROVA, Renata

See BINDEROVA-KLUCKY

BINDEROVA, Renata, and KLUCKY, Dalibor

1. A remark about ideals in a cartesian product of near-fields. submitted. E, F

BIRCH, Peter

See BIRCH-OSWALD

BIRCH, Peter, and OSWALD, Allan

1. Mappings of finite groups. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 15--24. T, E
2. Some comments on near-rings of mappings. Contributions to general algebra, 9 (Linz, 1994), 73--80, H\"{o}der-Pichler-Tempsky, Vienna, 1995.

BIRKENMEIER, Gary F.

1. Seminear-rings and near-rings induced by the circle operation. Riv. Mat. Pura Appl. 5 (1989), 59--68. MR 91f:16053 D', _D, Rs
2. Essential nilpotency in near-rings. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 57--62. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).
3. Andrunakievich's Lemma for near-rings. Contrib. to Gen. Alg. 9, Holder-Pichler-Tempsky, Wien (1995), 1--12.
4. Self-distributive rings and near-rings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 10--22. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

See also BIRKENMEIER-GROENEWALD, BIRKENMEIER-HEATHERLY, BIRKENMEIER-HEATHERLY-KEPKA, BIRKENMEIER-HEATHERLY-LEE, BIRKENMEIER-HEATHERLY-PILZ, BIRKERMEIER-HUANG, BIRKENMEIER-OLIVIER, BIRKENMEIER-WIEGANDT

BIRKENMEIER, G, and GROENEWALD, N.

1. Nearrings in which each prime factor is simple. Math. Pannon. 10 (1999), 257--269.

BIRKENMEIER, Gary F., and HEATHERLY, Henry E.

1. Medial near-rings. Monatsh. Math. 107 (1989), no. 2, 89--110. MR 90e:16056 B, N, S
2. Operation inducing systems. Alg. Univ. 24 (1987), 137--148. Ua, Rs, E, B
3. Polynomial identity properties for near-rings on certain groups. Near-Ring Newsletter 12 (1989), 5. 15. B, C'
4. Left self distributive near-rings. J. Austral. Math. Soc (Ser. A) 49 (1990), 273--296. MR 91g:16035 E, B, P', S
5. Medial and distributively generated near-rings. Monatshefte f\"{u}r Math. 109 (1990), 97--101. MR 92a:16051 B, N, S, D
6. Permutation identity near-rings and ``localized'' distributivity conditions. Monatshefte f\"{u}r Math. 111 (1991), 265--285. MR 92m:16066 B, D', _D, N, P'
7. Minimal ideals in near-rings. Comm. Algebra 20 (1992), 457--468. MR 92m:16067 E, D', _D, B
8. Minimal ideals in near-rings and localized distributivity conditions. J. Austral. Math. Soc. (Ser. A) 54 (1993), 156--168. MR 93k:16080 E, D, D', _D
9. Self-distributively generated algebras. Contributions to general algebra, 10 (Klagenfurt, 1997), 79--87, Heyn, Klagenfurt, 1998. MR 99i:16059 B, P'
10. Near-Rings in which each Prime Factor is Simple. Math. Pann. 10 (1999), 257--270. P', S

BIRKENMEIER, Gary F., HEATHERLY, Henry E., and KEPKA, T.

1. Rings with left self distributive multiplication. Acta Math. Hung. 60 (1-2) (1992), 107--114. B, P'

BIRKENMEIER, Gary F., HEATHERLY, Henry E., and LEE, Enoch K.

1. Prime ideals and prime radicals in near-rings. Monatsh. Math. 117 (1994), 179--197. P', R, S, B, D, Ua, N
2. Prime ideals in near-rings. Results. Math. 24 (1993), 27--48. P', R, S, P
3. Completely prime ideals and radicals in near-rings. Monatsh. Math. 117 (1994), 179--197. P', R, S, N
4. Near-rings in which every prime factor is integral. Pure. Math. Appl. 5 (1994), 257--279.
5. An Andrunakievich lemma for near-rings. Communications in Algebra 23 (1995), 2825--2850. D, E, X, B
6. Special radicals for near-rings. Tamkang J. Math. 27 (1996), 281--288. R, S, R', P', Ua

BIRKENMEIER, Gary F., HEATHERLY, Henry E., and PILZ, G.

1. Homomorphisms on groups I: Distributive and d.g. near-rings. Comm. Algebra 25 (1997), 185--211. D, _D
2. Near-rings and rings generated by homomorphisms of groups. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 199--210. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997). MR 98k:16065

BIRKENMEIER, G. F., and HUANG, Feng-Kuo

1. Annihiator conditions on polynomials. Comm. Algebra, to appear.

BIRKENMEIER, G, and OLIVIER, Werner A.

1. On complementary radicals determined by near-ring regularities. Algebra Colloq. 3 (1996), 157--167.

BIRKENMEIER, G, and WIEGANDT, R.

1. Supplementing radicals and decompositions of near-rings. Acta Math. Hungar.

BISWAS, B. K.

See BISWAS-DUTTA

BISWAS, B. K., and DUTTA, T. K.

1. Fuzzy ideal of a near-ring. Bull. Calcutta Math. Soc. 89 (1997), no. 6, 447--456. MR 2000f:16058
2. On fuzzy congruence of a near-ring module. Fuzzy Sets and Systems 112 (2000), no. 2, 343--348. MR 2001a:16074

BLACKBURN, Norman

See BLACKBURN-HUPPERT

BLACKBURN, Norman, and HUPPERT, Bertram

1. Finite groups III. Springer Verlag, New York-Heidelberg-Berlin, 1982. F, S'', D''

BLACKETT, Donald W.

1. Simple and semi-simple near-rings. Doctoral Diss., Princeton Univ., 1950. S, I, P
2. Simple and semi-simple near-rings. Proc. Amer. Math. Soc. 4 (1953), 772--785. MR 15:281 S, I, P
3. The near-ring of affine transformations. Proc. Amer. Math. Soc. 7 (1956), 517--519. MR 17:1225 A'
4. Simple near-rings of differentiable transformations. Proc. Amer. Math. Soc. 7 (1956), 599--606. MR 17:1226 E, S, T'
5. A countable near-ring dense in the near-ring of continuous transformations on $R_n$. Research Report, Dept. Math., Boston Univ., 1971. E, T'
6. Some near-rings dense in the near-ring of continuous mappings of $R_n$ into $R_n$. Research Report, Dept. Math., Boston Univ., 1972. E, T'
7. The commutativity of certain groups of fixed-point-free automorphisms. Riv. Mat. Univ. Parma (4) 10 (1984), 283--284. I', E
8. Connecting seminearrings to probability generating functions. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 75--82. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).

BLEVINS, D. K.

See BLEVINS-MAGILL-MISRA-PARNAMI-TEWARI

BLEVINS, D. K., MAGILL, Kenneth D., MISRA, P. R., PARNAMI, J. C., and TEWARI, U. B.

1. More on automorphism groups of laminated near-rings. Proc. Edinb. Math. Soc. 31 (1988), 185--195. MR 89m:16071 T, T', X

BOOTH, G. L.

1. A note on $\Gamma $-near-rings. Stud. Sci. Math. Hungar. 23 (1988), no. 3-4, 471--475. MR 90b:16043 X, E
2. Radicals of $\Gamma $-near-rings. Publ. Math. Debrecen 37 (1990), 223--230. MR 91j:16058 X, R, P'
3. Radicals in general $\Gamma $-near-rings. Quaestiones Math. 14 (1991), Nor. 2, 117--127. MR 92f:16055 X, R, P'
4. A note on $J_2$-radicals of $\Gamma $-near-rings. Stud. Sci. Math. Hungar. 27 (1992), no. 1-2, 235--240. MR 93k:16081 X, R, P'
5. Notes on Brown-McCoy radicals of $\Gamma $-near-rings. Periodica Math. Hungar. 22 (1991), 1--8. MR 92m:16068 X, R, P'
6. Equiprime infra-near-rings. Indian. J. Pure Appl. Math 22 (1991), 561--566. MR 92f:16054 X, R, P'
7. Jacobson radicals of $\Gamma $-near-rings. In `` Rings, modules and radicals (Hobart, 1987), " 1--12 (Pitman Res. Notes Math. Ser., 204.) Longman Sci. Tech., Harlow, 1989. MR 90m:16040 X, R, P'

See also BOOTH-GODLOZA, BOOTH-GROENEWALD, BOOTH-VELDSMAN, BOOTH-GROENEWALD-VELDSMAN

BOOTH, G., and GODLOZA, L.

1. On primeness and special radicals of $Gamma$-rings. in ``Rings and Radicals (Shijiazhuang 1994),'' Pitman Res. Notes Math. 346, Longman, 1996, 131--140. MR 97e:16100

BOOTH, G. L., and GROENEWALD, Nico J.

1. Special radicals of near-rings. Math. Japonica 37, No. 4 (1992), 701--706. MR 93h:16073 R, S, P'
2. A note on equiprime left ideals in a near-ring. submitted. P', R, E
3. On primeness in matrix near-rings. Arch. -Math. (Basel) 56 (1991), 539--546. MR 92e:16034 P', T, X
4. Special radicals of near-ring modules. Quaestiones Math. 15 (1992), 127--137. MR 93i:16060 R, S, P'
5. Equiprime $\Gamma $-near-rings. Quaestiones Math. 14 (1991), 411--417. MR 93a:16036 R, S, P'
6. Equiprime left ideals and equiprime N-groups of a near-ring. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 25--38. R, S, P'
7. On radicals of $\Gamma $-nearrings. Math. Japon. 35 (1990), no. 3, 417--425. MR 91h:16074 X, R, P'
8. Different prime ideals in near-rings II. in ``Rings and Radicals (Shijiazhuang 1994),'' Pitman Res. Notes Math. 346, Longman, 1996, 131--140. MR 97f:16067 P', R, S, Ua
9. Matrix $\Gamma $-near-rings. Math. Japon. 38 (1993), 973--979. MR 94g:16052
10. $\nu $-prime and $\nu $-semiprime near-rings. Math. Japon. 43 (1996), 425--430. MR 97c:16053
11. Special radicals of $\Omega $-groups. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 211--218. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
12. On strongly prime nearrings. Indian J. Math. 40 (1998), 113--121. MR 2000a:16086

BOOTH, G. L., GROENEWALD, Nico J., and VELDSMAN, Stefan

1. A Kurosh-Amitsur prime radical for near-rings. Commun. Alg. 18 (1990), 3111--3122. MR 91f:16054 R, P'
2. Strongly equiprime near-rings. Quaestiones Math. 14 (1991), 483--489. MR 92m:16069 P', R, E

BOOTH, G. L., and VELDSMAN, Stefan

1. Special radicals of near-rings and $\Gamma $-near-rings. Period. Math. Hungar. 29 (1994), 111--126. MR 95k:16062

BOTHA, Suzette G.

1. Nilpotency and solvability in categories. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 83--88. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). MR 96h:18006
2. Ideals in Categories. Chinese Journal of Mathematics 21 (1993), 287--297.
3. Quasi-ideals and bi-ideals in categories. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 219--224. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997). MR 98j:18015

See also BOTHA-BUYS

BOTHA, S. G., and BUYS, A.

1. Idempotent and abelian ideals in categories. Chinese J. Math. 23 (1995), no. 4, 319--327. MR 96m:18016

BOUCHARD, P.

See BOUCHARD-FONG-KE-YEH

BOUCHARD, P., FONG, Yuen, KE, Wen-Fong, and YEH, Yeong-Nan

1. Counting $f$ with $f\circ g=g\circ f$. Result in Mathematics 31 (1997), 14--27. E, E', T

BOYKETT, Tim

1. Ring-like structures in theoretical Computer Science. Thesis Univ. Western Australia, 1989. E, X, Rs, Sy
2. Seminearrings of polynomials over semifields: A note on Blackett's Fredericton paper. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 225--236. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997). P'', Rs
3. Seminearring models of reversible computation I. Institutsbericht Nr. 553, Johannes Kepler Univ. Linz, Austria (1997). Rs, Sy
4. Ferrero pairs of all possible orders exist. manuscript. P''
5. An Algebraic Perturbation Theory for State Automata. Contributions to General Algebra 12, Proceedings of the Vienna Conference, June 3-6, 1999, Verlag Johannes Heyn, Klagenfurt, 2000, 109--119. Rs, Sy
6. Construction of Ferrero Pairs of all Possible Orders. submitted. P"

See also BOYKETT-N\"{O}BAUER

BOYKETT, Tim, and N\"{O}BAUER, Christof

1. A class of groups which cannot be the additive groups of nearrings with identity. Contributions to General Algebra 10, Klagenfurt 1997, 89--99. MR 99i:16078

BRENNER, Joel L. (1912--1997)

1. Maximal ideals in the near-ring of polynomials mod 2. Pacific J. Math. 52 (1974), 595--600. MR 50:9984 Po
2. Composition algebras of polynomials. Pacific J. Math. 118 (1985), 281--293. Po

BROWN, B.

See BROWN-MCCOY

BROWN, B., and MCCOY, N. H.

1. Some theorems on groups with applications to ring theory. Trans. Amer. Math. Soc. 69 (1950), 301--311.

BROWN, Harold David

1. An extension of the Jacobson radical. Proc. Amer. Math. Soc. 2 (1951), 114--117. R,S
2. Near-algebras. Illinois J. Math. 12 (1968), 215--227. Na, D', S, T'
3. Distributor theory in near algebras. Comm. Pure App. Math. 21 (1968), 535--544. Na, D', I, C

BRUTTI, Paolo

See BASILE-BRUTTI

B\"{U}HLER, Beat

1. Kopplungen auf Gruppenerweiterungen und Potenzreihenschiefk\"{o}rpern mit Anwendungen zu Konstruktion linksangeordneter Gruppen und Fastk\"{o}rper. Herbert Utz Verlag Wissenschaft, M\"{u}nchen, 1995. F, P'', O

BURE\v{S}, J.

1. Construction of one type of a quasifield. Grundlagen der Geometrie und algebraische Methoden (Internat. Kolloq., P\"{a}dagog. Hochsch. "Karl Liebknecht", Potsdam, 1973), pp. 122--124. Potsdamer Forschungen, Reihe B, Heft 3, Pädagog. Hochsch. "Karl Liebknecht", Potsdam, 1974.

See also BURE\v{S}-KLOUDA

BURE\v{S}, Jarol\'{i}m, and Klouda, Josef

1. One generalization of quasifield. Math. Slovaca 26 (1976), no. 4, 271--285.

BURKE, John C.

1. Remarks concerning tri-operational algebra. Report of a Math. Colloqu., Issue 7, Notre Dame (1946), 68--72. MR 8:61 Cr, E

BUYS, A.

See BOTHA-BUYS, BUYS-GERBER

BUYS, A., and GERBER, Gert K.

1. The prime radical for $\Omega $-groups. Comm. Algebra 10 (1982), 1089--1099. R, P', Ua
2. The Levitzki radical for $\Omega $-groups. Publ. Inst. Math. 35 (1984), 49--51. MR 86e:20078 R, N, Ua
3. Nil and s-prime $\Omega $-groups. J. Austral. Math. Soc. 38 (1985), 222--229. MR 86f:20091 R, N, P', Ua
4. Prime and k-prime ideals in $\Omega $-groups. Quaestiones Math. 8 (1985), 15--32. MR 87e:20128 R, P', Ua
5. Special classes in $\Omega $-groups. Ann. Univ. Sci. budapest 29 (1986), 73--85. MR 88g:20151 R, Ua

CAGGEGI, Andrea

1. Generalized Andr\'{e} planes. (Italian) Rend. Circ. Mat. Palermo (2) 25 (1976), no. 3, 213--233 (1977). MR 80i:51005
2. New Bol quasifields. (Italian) Matematiche (Catania) 35 (1980), no. 1-2, 241--247 (1983). MR 85g:51003

CALZETTI, Rodolfo

See CALZETTI-DI SIENO

CALZETTI, Rodolfo, and DI SIENO, Simonetta

1. On biregularity in a near-ring. (Italian) Istit. Lombardo Accad. Sci. Lett. Rend. A 124 (1990), 269--282 (1991). MR 95k:16063

CANNON, G. Alan

1. Centralizer near-rings determined by End G. Doctoral Dissertation, Texas A\&M University, 1995. T, S, L
2. Centralizer near-rings determined by End G. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 89--111. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). T, S, L
3. Localness of the centralizer nearring determined by End G. Rocky Mountain J. Math. 30 (2000), no. 1, 115--133. T, L

See also CANNON-KABZA

CANNON, G. Alan, and KABZA, Lucyna

1. Simplicity of the centralizer nearring determined by End G. Algebra Colloq. 5 (1998), 383--390. MR 2000a:16087 T, S, F
2. The lattice of ideals of the nearring of coset preserving functions. Quaestiones Math., to appear. E,T
3. Right ideals in transformation nearrings, submitted. T

CARANTI, Andreas

1. Finite p-groups of exponent $p^2$ in which each element commutes with its endomorphic images. J. Algebra 97 (1985), 1--13. E'', E

CARTAN, Henri

1. Theory of analytic functions. Addison-Wesley, Reading, Massachusetts, 1963, 9--16. Po

CHAN, G. H.

See CHAN-CHEW

CHAN, G. H., and CHEW, Kim L.

1. On extensions of near-rings. Nanta Math. 5 (1971), 12--21. MR 46:1851 Q', E'

CHANDRASEKHARA RAO, K.

See CHANDRASEKHARA RAO-GOPALAKRISHNAMOORTHY

CHANDRASEKHARA RAO, K., and GOPALAKRISHNAMOORTHY, G.

1. Certain near-rings are commutative rings. Pure Appl. Math. Sci. 47 (1998), no. 1-2, 39--45.

CHANDY, Attupurathuvadakkethil J.

1. Rings generated by inner automorphisms of non-abelian groups. Doctoral Diss., Boston Univ., 1965. E''
2. Rings generated by inner automorphisms of non-abelian groups. Proc. Amer. Math. Soc. 30 (1971), 59--60. MR 43:6293 E''
3. D. g. near-rings on certain groups. Monatsh. Math. 86 (1978), 101--105. A, D
4. Near-rings generated by the inner automorphisms of L-groups. submitted. E''

CHAO, Dale Zao-Tzu

1. A radical of unitary near-rings. Tamkang J. Math. 6 (1975), 293--299. MR 53:13324 R, Q
2. Near-rings without non-zero nilpotent elements. Math. Japan 21 (1976), 449--454 and Nanta Math. 10 (1977), 91--94. MR 55:5703 W, N, I, I', R'

CHEN, Hong Ji

1. The value place and valuation near-ring of an S-system $F(+,\cdot ,1)$. (Chinese). J. East China Norm. Univ. Natur. Sci. Ed. 1994, no. 1, 17--22. MR 95i:16047
2. Valuation values and value places of $S$-systems. (Chinese). J. Math. (Wuhan) 15 (1995), no. 1, 9--20. MR 97d:51021

CHEN, I-Hsing

1. Some combinatorial structures arising from finite planar near-rings. Thesis, 1991, National Chiao Tung Univ., Hsinchu. P''

CHEN, Yi

1. On characterizing near-fields. Aequationes Math. 20 (1980), no. 2-3, 119--128. MR 81h:12021

CHEW, Kim L.

See CHAN-CHEW

CHO, Yong Uk

1. The structure of regularity of near-rings. Comm. Korean Math. J. 2 (1987), 25--32.
2. On structures of near-rings and near-ring modules. doctoral dissertation (1987).
3. Modified chain conditions for near-ring modules. Comm. Korean Math. J. 5 (1990), 151--164.
4. Properties of positive derivations on ordered strongly regular near-rings. Pusan Kyongnam Math. J. 6 (1990), 155--158.
5. Properties of exactness and projectivity of $N$-modules. Pusan Women's Univ. J. 31 (1991), 107--120.
6. General concepts of regularity of near-rings. Pusan Kyongnam Math. J. 7 (1992), 147--155.
7. Factor theorems and their application for $N$-groups. Kyungpook Math. J. 32 (1992), 337--346.
8. On the relation between ordered properties in regular near-rings and automorphism groups in laminated near-rings. Pusan Kyongnam Math. J. 8 (1992), 151--162.
9. On analyses of near-ring morphisms. Pusan Kyongnam Math. J. 10 (1994), 287--293.
10. Near-rings with chain conditions and nil-derivations. Pusan Kyongnam Math. J. 11 (1995), 153--167.
11. A study on derivations in near-rings. submitted.
12. Some properties on faithful $R$-groups. submitted.
13. Near-rings with generalized chain conditions. Far East J. Math. Sci. 6 (1998), 505--514. MR 99i:16079

CHOUDHARY, S. C.

1. On near-rings and near-ring modules. Diss. Indian Inst. of Technology, Kanpur, India (1972). E, B, M, N, P, P', Q, R, R', S, X
2. On projective covers in near-rings. San Benedetto del Tronto, 1981, 61--72. H

See also BHOPATKAR-CHOUDHARY-TEWARI, CHOUDHARY-GOYAL, CHOUDHARY-JAT, CHOUDHARY-TEWARI

CHOUDHARY, S. C., and GOYAL, A. K.

1. On generalized regular near-rings. Notices AMS, Feb. 1979.
2. On strongly regular near-rings. Notices AMS, Feb. 1979.
3. Generalized regular near-rings. Stud. Sci. Math. Hungar. 14 (1982), 69--76. MR 83h:16046 R', B, R, S
4. Near-rings with no non-zero nilpotent two-sided R-subsets. Period. Math. Hungar. 20 (1989), no. 2, 161--167. MR 90g:16035 N, R', E, P'
5. Strictly weak right duo near-rings. to appear in Period. Math. Hungarica. X, P, P', R'

CHOUDHARY, S. C., and JAT, J. L.

1. On left bipotent near-rings. Proc. Edinb. Math. Soc. 22 (1979), 99--197. MR 80j:16024 I
2. On strict weakly regular near-rings. Math. Student 46 (1978/1982), 175--182. MR 84b:16042 R'
3. Semicompletely prime radical and primary ideals in near-rings. J. Ind. Math. Soc. 46 (1985), 211--229. MR 88a:16067 P', R
4. Near-rings with conditions $C_1$ and $C_2$. Indian Mathematical Society (1986).

CHOUDHARY, S. C., and TEWARI, K.

1. $G$-radical in near-rings. Notices AMS, October 1972. R, Q, S, M
2. On strictly semisimple near-rings. Abh. Math. Sem Univ. Hamburg 40 (1974), 256--264. MR 49:5105 S, P
3. $($NB$)$-property in near-rings. Riv. Math. Univ. Parma 4 (1979), 29--36. MR 80f:16037 X, N, E, R

CHOWDHURY, Khanindra Chandra

1. Goldie theorem analogue for Goldie near-rings. Indian J. Pure Appl. Math. 20 (1989), no. 2, 141--149. MR 90e:16057 P', Q', E, N
2. Radical Goldie near-rings. Indian J. Pure Appl. Math. 20 (1989), no. 5, 439--445. MR 90e:16058 P', Q', R, N
3. Goldie M-groups. J. Austral. Math. Soc. 51 (1991), 237--246. X, N, E, P'
4. On near-rings with ACC on annihilators. Math. Pannonica, to appear. E, P'

See also CHOWDHURY-DE-KATAKI, CHOWDHURY-KATAKI, CHOWDHURY-MASUM, CHOWDHURY-MASUM-SAIKIA, CHOWDHURY-SAIKIA, CHOWDHURY-TAMULI, MASUM-SAIKIA-CHOWDHURY

CHOWDHURY, K. C., DE, B., and KATAKI, R.

1. On near-ring radicals and $N$-subgroups forming chains. Far East J. Math. Sci. (FJMS) 2 (2000), no. 4, 577--595.

CHOWDHURY, K. C., and KATAKI, R.

1. On s-rank of an N-group with FGD. manuscript. R, S, E, N

CHOWDHURY, K. C., and MASUM, A.

1. A note on regular left Goldie nearrings. Nat. Acad. Sci. Lett. 12 (1989) 433--435. R', Q'
2. On subnear-rings of a strictly left Goldie near-ring. Bull. Pure Appl. Sci., sec. E, 14 (1995), 27--33.

CHOWDHURY, K. C., MASUM, A., and SAIKIA, H. K.

1. FSD N-groups with ACC on annihilators. Indian J. Pure Appl. Math. 24 (12) (1993), 747--744. X, E, P'

CHOWDHURY, K. C., and SAIKIA, H. K.

1. On quasi direct sum and $^d$ property of near-ring groups. Bull. Calcutta Math. Soc. 87 (1995), 45--52. MR 96h:16050
2. On near-ring subgroups of projective and $^d$ near-ring groups. Bull. Calcutta. Math. Soc. 88 (1996), 63--70.
3. A note on $^dK$-group. Advances in mathematics and statistics, 73--76, Bull. Sci. Ser., 1, Sharma, Delhi, 19??.
4. $^dK$-groups with ascending chain conditions. Math. Ed. (Siwan) 29 (1995), no. 1, 3--6.
5. A note on $^dK$-groups. Bull. Pure Appl. Sci. Sec. E Math. 12 (1993), no. 1-2, 73--76.
6. On near-rings with ACC on annihilators. Math. Pannon. 8 (1997), no. 2, 177--185.

CHOWDHURY, K. C., and TAMULI, B. K.

1. Goldie near-rings. Bull. Calcutta Math. Soc. 80 (1988), no. 4, 261--269. MR 89m:16076 P', Q', E, N

CLARK, John F., Jr.

1. Rings associated with the rings of endomorphisms of finite groups. J. Washington Acad. Sci. 40 (1950), 385--397. MR 13:100 E, T

\v{C}ILIN, V. I.

1. Regular subsemifields of topological semifields. (Russian) Dokl. Akad. Nauk UzSSR 1976, no. 1, 5--6.

CLAY, James R. (1938--1996)

1. The near-rings on a finite cyclic group. Amer. Math. Monthly 71 (1964), 47--50. A
2. The near-rings definable on an arbitrary group and the group of left distributive multiplications definable on an abelian group. Doctoral Diss., Univ. of Washington, 1966. E, A
3. Inbedding an arbitrary ring in a non-trivial near-ring. Amer. Math. Monthly 74 (1967), 406--407. MR 35:5476 E'
4. The near-rings on groups of low order. Math. Z. 104 (1968), 364--371. MR 37:258 C', E
5. Some geometric interpretations of planar near-rings. Oberwolfach, 1968. P'', G
6. The group of left distributive multiplications on an abelian group. Acta Math. Sci. Hungar. 19 (1968), 221--227. MR 38:193 A, E
7. A note on integral domains that are not right distributive. Elem. Math. 24 (1969), 40--41. MR 39:1054 I'
8. Research in near-rings using a digital computer. Bit. 10 (1970), 249--265. MR 43:293 C', A, E, I', B
9. The near-rings on the cyclic group of order 8. manuscript. C', A
10. Some algebraic aspects of planarity. Atti del Convengo di Geometrica Combinatoria e sue applicationi, Univ. degli Studi, Perugia (1971), 163--172. MR 50:226 P'', I', G
11. Generating balanced incomplete block designs from planar near-rings. J. Algebra 22 (1972), 319--331. MR 46:514 P'', I', A
12. Generating balanced incomplete block designs from planar near-rings. Oberwolfach, 1972. P'', A
13. The structure of dilatation groups of generalized affine planes. Journal of Geometry 6 (1975), 1--19. MR 51:8947 G, E, Q'
14. The group of units of $M_G(\Gamma )$. Oberwolfach, 1976. T, X
15. The fibred product near-ring and near-ring modules for some categories. Conf. Edinbg., 1978. H
16. The fibred product near-ring and near-ring modules for certain categories. Proc. Edinbg. Math. Soc. 23 (1980), 15--26. MR 81i:16044 H, A', E''
17. Lectures on near-rings. Technical Univ. Munich, 1980. G, H, P'', S'', E, A', A
18. Suggested directions for future research in near-rings. San Benedetto del Tronto, 1981, 13--24. E, A', H, T', P''
19. On the sum of two endomorphisms. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 9. E, H, _D, E''
20. More Balanced Incomplete Block Designs from Frobenius groups. Discrete Math. 59 (1986), 229--234. P'', X
21. The near-ring of some one-dimensional noncommutative formal group laws. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 41--52. MR 88f:16038 X
22. Addition of algebra endomorphisms. J. Algebra 140 (1991), no. 2, 263--283. MR 92g:16061 E, E'', F', Po
23. Applications of planar near-rings to geometry and combinatorics. Res. Math. 12(1987), 71--85. P'', G, X
24. Geometric and combinatorial ideas related to circular planar near-rings. Bull. Inst. Math. Acad. Sinica 16 (1988), 275--283. MR 91b:51028 P'', G, X
25. Circular block designs from planar near-rings. Combinatorics '86 (Trento 1986), Ann. Discr. Math. 37, 95--105, North-Holland, Amsterdam 1988. MR 89g:05019 P''
26. Compound closed chains in circular planar near-rings. Combinatorics '90, Proc. Conf., Gaeta/Italy 1990, Ann. Discrete Math. 52 (1992), 93--106. MR 94d:16043 P'', G, X
27. An unexpected group isomorphism yields a surprising affine plane and more. Contrib. General Algebra 7 (1991), 71--74. P'', G, X
28. Tactical configurations from a planar near-ring can also generate balanced incomplete block designs. J. Geometry 32 (1988), 13--20. MR 89f:05026 P'', G
29. Circular planar nearrings with applications. Proc. Kaist Math. Workshop Korea, 1992, 149--177. MR 94c:16058 P'', G, X
30. Nearrings: Geneses and applications. Oxford Univ. Press Inc., Oxford, 1992. MR 94b:16001 All from A to X
31. The equation $ax = bx + c$. manuscript, Univ. Arizona, 1993. E, P'', G
32. Geometry in fields. Algebra Colloquium 1 (1994), 289--304.
33. The introduction of the double planar near-ring. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 34--36. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. P''
34. Some applications of nearrings. in ``Rings and Radicals (Shijiazhuang 1994),'' Pitman Res. Notes Math. 346, Longman, 1996, 15--27.

See also ANSHEL-CLAY, BETSCH-CLAY, CLAY-DOI, CLAY-FONG, CLAY-GRAINGER, CLAY-KE-KIECHLE, CLAY-KIECHLE, CLAY-LAWVER, CLAY-KARZEL, CLAY-KAUTSCHITSCH, CLAY-MALONE, CLAY-MAXSON, CLAY-MAXSON-MELDRUM, CLAY-MELDRUM, CLAY-VAN DER WALT, CLAY-YEH

CLAY, James R., and DOI, Donna K.

1. Near-rings with identity on alternating groups. Math. Scand. 23 (1968), 54--56. MR 40:2714 A
2. Maximal ideals in the near-ring of polynomials over a field. Colloqu. Math. Soc. Janus Bolyai 6, Rings, Modules and Radicals, Keszthely (Hungary) 1971, North-Holland 1973, 117--133. MR 50:2262 Po, S, R, G

CLAY, James R., and FONG, Yuen

1. Computer programs for investigating syntactic near-rings of finite group-semi-automata. Bull. Instit. Math. Academia Sincia, vol. 16, no. 4 (1988), 295--304. MR 91f:68157 Sy, E, T
2. On syntactic near-rings of even dihedral groups. Results Math. 23 (1993), 23--44. MR 93k:16082 Sy, E, A
3. On syntactic near-rings of odd dihedral groups. manuscript. Sy

CLAY, James R., and GRAINGER, Gary

1. Endomorphism near-rings of odd generalized dihedral groups. J. Algebra 127 (1989), 320--339. MR 90k:16039 E''

CLAY, James R., and KARZEL, Helmut J.

1. Tactical configurations derived from groups having a group of fixed-point-free automorphism. J. Geometry 27 (1986), 60--68. P'', G

CLAY, James R., and KAUTSCHITSCH, Hermann

1. Quotients of power series composition rings. submitted. Po, Q', E
2. Near-rings generated by R-modules. Math. Pann. 4 (1993), 287--297. R, Po, E, G

CLAY, James R., KE, Wen-Fong, and KIECHLE, Hubert

1. A cryptosystem using unusual affine planes. manuscript. P'', G, X

CLAY, James R., and KIECHLE, Hubert

1. Linear codes from planar near-rings and M\"{o}bius planes. Algebras, Groups and Geometries 10 (1993), 333--344. P'', X

CLAY, James R., and LAWVER, Donald A.

1. Boolean near-rings. Canad. Math. Bull. 12 (1969), 265--273. MR 40:2715 B

CLAY, James R., and MALONE, Joseph J.

1. The near-rings with identities on certain finite groups. Math. Scand. 19 (1966), 146--150. MR 34:7589 A

CLAY, James R., and MAXSON, Carlton J.

1. The near-rings with identities on generalized quaternion groups. Ist. Lombardo, Academia di Science e Lettere (A) 104 (1970), 525--530. MR 44:2788 A

CLAY, James R., MAXSON, Carlton J., and MELDRUM, John D. P.

1. The group of units of centralizer near-rings. Comm. Algebra 12 (21), (1984) 2591--2618. MR 85j:16055 T, X

CLAY, James R., and MELDRUM, John D. P.

1. Amalgamated product near-rings. Proc. Conf. Universal Algebra Klagenfurt (1982), B. G. Teubner (1983), 43--70. H, E''

CLAY, James R., and VAN DER WALT, Andies P. J.

1. Subnear-rings of $M_0(V)$. submitted. T, E
2. Planar near-rings having affine configurations with two pencils. submitted. P'', G, X

CLAY, James R., and YEH, Yeong-Nan

1. On some geometry of Mersenne primes. Period. Math. Hungar. 29 (1994), no. 2, 137--157. MR 96e:11009 P'', G

COOPER, Charles

1. Some properties of near-rings. M. S. Thesis, McNease State Univ., 1974. Rs

COURVILLE, James R.

1. On idempotents and subsystems generated by idempotents in near-rings. Diss. Univ. Southw. Louisiana, 1976. I, S, Po

See also COURVILLE-HEATHERLY

COURVILLE, James R., and HEATHERLY, Henry E.

1. Near-rings with a special condition on idempotents. Math. Pannon 10 (1999), 197--209. MR 2000e:16039 I, T, P, R', E

COX, Raymond H.

See BEIDLEMAN-COX

CURJEL, Caspar R.

1. On the homology decomposition of polyhedra. Illinois J. Math. 7 (1963), 121--136. MR 26:3049 H
2. Near-rings of homotopy classes. manuscript. H, R, Q, N

DANCS-GOVES, Susan

1. The subnear-field structure of finite near-fields. Bull. Austral. Math. Soc. 5 (1971), 275--280. MR 45:3482 F, D''
2. On finite Dickson near-fields. Abh. Math. Sem. Univ. Hamburg 37 (1972), 254--257. MR 46:1836 F, D''
3. Locally finite near-fields. Doctoral Diss., Austral. National Univ. Canberra 1974. F, D''
4. Locally finite near-fields. Abh. Math. Sem. Univ. Hamburg 8 (1979), 89--107. MR 80f:12027 F, D''

DAS, Pratyayananda

See ADHIKARI-DAS

DA\v{S}I\'{C}, Vu\v{c}i\'{c}

1. Some operations with matrices and the near-ring of affine transformations. (Serbocroatian) Matem. Vestnik 2 (15) (30), 1976, 323--329. A
2. A class of near-rings. (Russian). Mat. Vestnik 1 (14) (29) 1977, 221--224. D', D
3. A generalization of distributively generated near-rings. Conf. Edinbg., 1978. D', D
4. A defect of the distributivity of near-rings. Math. Balcan. 8:8 (1978), 63--75. MR 84k:16050 D', D, _D
5. Near-rings with defect of distributivity. (Serbocroatian), Diss. Univ. Sarajevo (Yugoslavia) 1979. D', D
6. Near-rings with defect of distributivity. Publ. Inst. Math. (Beograd) (N.S.) 28(42) (1980), 51--59. MR 83d:16040 D', D
7. On the radicals of near-rings with a defect of distributivity. Publ. Inst. Math. 28 (1980), 51--59. MR 83d:16040 D', D, R, N, Q
8. D-endomorphism near-rings. Publ. Inst. Math. 28 (1980), 61--75. MR 83d:16041 E'', D', D, R, N
9. Near-rings of D-affine type. Algebraic Conference, Novi Sad (Yugoslavia), 1981, 93--99. MR 84c:16034 A', D, _D
10. Strictly semiprime ideals and nilpotency in near-rings with defect of distributivity. Publ. Math. (Debrecen) 29 (1982), 287--292. MR 84d:16045 P', N, D', D
11. Distributor series of n-ary near-algebras. Macedonian Acad. Sci. Arts, Proc. Symp. n-ary Structures, Skopje 1982, 65--70. MR 85j:16056 D, _D, Rs
12. Defect and radicals of D-endomorphism near-rings. Publ. Inst. Math. 31 (45) (1982), 23--25. MR 85a:16042 D, _D, R, E
13. Some properties of the defect of distributivity of a near-ring. Algebr. Conf., Beograd (1982), 67--71. D, _D
14. Some properties of D-distributive near-rings. Glasnik Mat. 18 (38) (1983), 237--242. MR 85c:16052 D, _D, C
15. Some properties of D-endomorphism near-rings. Algebra and Logic, Proc. 4th Conf. Zagreb 1984 (1985), 39--42. MR 87b:16038 D, _D
16. On some radicals in near-rings with a defect of distributivity. Publ. Inst. Math. Beograd 38 (1985), 45--49. MR 87h:16049 D', _D, R, N
17. On D-regular near-rings. Proc. Conf. ``Algebra and Logic", Cetinje 1986, 47--54. MR 89e:16051 D, R'
18. On a decomposition of near-rings in a subdirect sum of near-fields. Publ. Inst. Math. (Beograd) 41 (55) (1987), 43--47. MR 88j:16045 F, P', C
19. Hypernear-rings. Fourth Int. Congress on AHA (1990), 75--85, World Scientific. MR 92i:16033 Rs
20. On the Levitzki-radical in some nearrings. Proc. Conf. ``Algebra and Logic", Sarajevo 1987, 43--47, Univ. Novi Sad, Novi Sad, 1989. R, S
21. The Levitzki-radical in n-ary near-algebras. Glas. Mat. Ser. II 25 (45) (1990), 31--41. Na, R, S
22. Hypernear-rings. Algebraic hyperstructures and applications (X\'{a}nthi, 1990), 75--85, World Sci. Publishing, Teaneck, NJ, 1991. MR 92i:16033
23. The singular ideal of a group over an integral near-ring. (Italian) Istit. Lombardo Accad. Sci. Lett. Rend. A 127 (1993), no. 1, 95--106. MR 95c:16057

See also DA\v{S}I\'{C}-PERIC

DA\v{S}I\'{C}, Vu\v{c}i\'{c}, and PERIC, Veselin

1. D-Kommutativit\"{a}t der Fastringe mit Distributivit\"{a}tsdefekt (English and Serbocroation summaries), Glasnik Matem Ser. III, 15 (35) (1980), 25--31. D', D, B
2. Nearrings with a minimal defect of distributivity. Math. Montisnigri 7 (1996), 1--11.

DASKALOV, G. A.

See DASKALOV-RAKHNEV

DASKALOV, G. A., and RAKHNEV, A. K.

1. Construction of near-rings on finite cyclic groups (Bulgarian; English summary), Proc. 14th Spring Conf. Un. Bulgar. Math., Sofia 1985. MR 87c:16035 A, _D

DE, B.

See CHOWDHURY-DE-KATAKI

DE LA ROSA, B.

See DE LA ROSA-FONG-WIEGANDT, DE LA ROSA-VAN NIEKERK-WIEGANDT, DE LA ROSA-WIEGANDT

DE LA ROSA, B., FONG, Y., and WIEGANDT, R.

1. Complementary radicals revisited. Acta Math. Hungary 65 (1994), 253--264. R, S, Ua, A

DE LA ROSA, B., VAN NIEKERK, J. S., and WIEGANDT, R.

1. A concrete analysis of the radical concept. Math. Pannon. 3 (1992), 3--15.
2. Corrigendum to: ``A concrete analysis of the radical concept" [Math. Pannon. {3} (1992), no. 2, 3--15; MR 94i:16010] Math. Pannon. 4 (1993), no. 1, 151.

DE LA ROSA, B., and WIEGANDT, R.

1. Characterizations of the Brown-McCoy radical. Acta Math. Hung. 46 (1985), 129--132. R, Ua

DE STEFANO, Stefania

1. Remarks on quasi-regularity in a distributive near-ring. San Benedetto del Tronto, 1981, 143--146. _D, Q
2. Socles of near-rings with identity. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 10--12. E, N, P, R, S

See also DE STEFANO-DI SIENO, DE STEFANO-RADICE

DE STEFANO, Stefania, and DI SIENO, Simonetta

1. Sui radicali di un quasi-anello distributivo. Istituto Mat. Univ. Milano, 1978. _D, D, Q, E, P
2. Sul radicale di Jacobson di un quasi-anello distributivo. Nota I, Rend. Ist. Lomb. Acc. Sc. Lett. Rend. Sc. A 112 (1978), 192--204. MR 81j:16042 a, b _D, R, Q, E, P
3. Sul radicale di Jacobson di un quasi-anello distributivo. Nota II, Rend. Ist. Lomb. Acc. Sc. Lett. Rend. Sc. A 112 (1978), 274--282. _D, R, Q, E, P
4. Sulle somme di ideali sinistri minimali di un quasi-anello distributivo. Rend. Ist. Lomb. Acc. Sc. Lett. Rend. Sc. A 115 (1981), 255--274. MR 86h:16035 _D
5. Anelli e quasi-anelli debolmente semiprime. Atti della Academia delle Scienze di Torino (1983). MR 87g:16059 P', _D
6. The maximal regular ideal of a distributive near-ring. Rend. Ist. Lomb. Acc. Sc. Lett. Rend. Sc. A 117 (1983), 153--167. MR 87g:16060 _D, R'
7. Completely reducible distributive near-rings. Rend. Ist. Lomb. Acc. Sc. Lett. Rend. Sc. A 118 (1984), 153--168. MR 88f:16041 _D, P'
8. On the type v-socles of a near-ring. Arch. Math. 42 (1984), 40--44. MR 85g:16021 S, P
9. A remark on completely reducible near-rings. Bull. Austral. Math. Soc. 31 (1985), 35--40. MR 86d:16043 P, R
10. On the existence of nil ideals in distributive near-rings. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 53--58. MR 88f:16039 D, N
11. Distributive near-rings with minimal square. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 59--62. MR 88f:16040 D, E
12. Distributive elements and endomorphisms of a near-ring. Arch. Math. 50 (1988), 29--33. MR 88m:16040 D, D', E''
13. Semiprime near-rings. J. Austral. Math. Soc. 51 (1991), 88--94. MR 92f:16056 P', E
14. Singular and nonsingular N-groups. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 39--43. X, E, B, N
15. Strictly essential ideals and singularity in groups on near-rings. (Italian), Rend., Sci. Mat. Appl., A 125 (1991), 171--179.
16. Nearrings with no nilpotent N-subsets. Istit. Lomb. Acc. Sci. Lett. Rend. A 129 (1995), 61--69.

DE STEFANO, Stefania, and RADICE, Elena

1. Essential extensions of a near-ring. (Italian, English summary), Rend., Sci. Mat. Appl., A 124 (1990), 161--172. MR 95k:16064 X, E

DEAN, Burton Victor

1. Near-rings and their isotopes. Doctoral Diss., Univ. of Illinois 1952. X

DEMBOWSKI, Peter

1. Finite Geometries. Springer 1968 (Ergenisse der Mathematik, vol. 44). MR 38:1597 F, G

DENG, Ai Ping

1. Ideals and derivations in prime near-rings. (Chinese). Math. Appl. 13 (2000), no. 1, 98--101. MR 2000j:16070

DESKINS, Wilbur E.

1. A radical for near-rings. Proc. Amer. Math. Soc. 5 (1954), 825--827. MR 16:212 R, S
2. A note on the system generated by a set of endomorphisms of a group. Michigan Math. J. 6 (1959), 45--49. MR 21:1320 E''

DHEENA, P.

1. On distributively generated near-rings with generators forming inverse semigroups. Indian J. Pure Appl. Math 17 (1986), 1309--1313. MR 88c:16047 D, _D, E, I, M'
2. On near-fields. Indian J. Pure Appl. Math. 17 (1986), 322--326. MR 87e:16093 F
3. On strongly regular near-rings. J. Indian Math. Soc. 49 (1985/87), 201--208. MR 89d:16048 R'
4. A generalization of strongly regular near-rings. Indian J. Pure Appl. Math. 20 (1989), no. 1, 58--63. MR 89k:16066 R'
5. A note on a paper of S. K. Lee: ``Generalization of J. L. Jat's theorems,'' [Math. Japon. 29 (1984), no. 4, 655--657; MR 86e:16043], J. Indian Math. Soc. (N. S.) 53 (1988), no. 1-4, 227--229. MR 90i:16031
6. Strongly left bipotent near-rings. submitted. B
7. A note on strongly regular near-rings. submitted. R'

See also DHEENA-GANESAN, DHEENA-RAJESWARI

DHEENA, P., and GANESAN, N.

1. On finite near-rings. J. Annamalai Univ., Part B, Sci., 32 (1979), 89--95.

DHEENA, P., and RAJESWARI, C.

1. On nearrings with derivation. J. Ind. Math. Soc. 60 (1994), 267--271.
2. Weakly regular nearrings. Indian J. Pure Appl. Math. 28 (1997), 1207--1213. MR 99d:16051
3. Right self commutative near-rings. J. Indian Math. Soc. (N.S.) 65 (1998), no. 1-4, 27--29.

DHOMPONGSA, S.

See DHOMPONGSA-SANWONG

DHOMPONGSA, S., and SANWONG, J.

1. Rings in which additive mappings are multiplicative. Period. Math. Hung. 22 (1987), 357--359. MR 89a:16050 E, X

DI SIENO, Simonetta

1. Minimal ideals of a distributive near-ring. San Benedetto del Tronto, 1981, 147--149. _D, E
2. Completely reducible N-groups. Con. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 13--14. P, S, E, N, R
3. On one-sided maximal ideals in weakly semiprime near-rings. Conf. T\"{u}bingen, 1985. P', E

See also CALZETTI-DI SIENO, DE STEFANO-DI SIENO

DICKSON, Leonard E. (1874-1954)

1. Definitions of a group and a field by independent postulates. Trans. Amer. Math. Soc. 6 (1905), 198--204. E, F, D''
2. On finite algebras. Nachr. Akad. Wiss. G\"{o}ttingen (1905), 358--393. E, F, D''

DIENER, Andrew M.

1. Distributive Elements in Centralizer Near-Rings. Ph.D. Diss., Texas A \& M, Texas, 1999.
2. Endomorphisms and Distributive Elements in Near-Rings Determined by Rings and Modules. Results in Math., to appear.

DOI-WATKINS, Donna K.

1. Near-rings with identities on alternating groups and ideals in various near-rings. Honors Thesis, University of Arizona, 1969. E. A

See also CLAY-DOI

DU, Bau-Sen

1. On regular near-rings. Thesis, National Tsing Hua Univ. Taiwan, 1974. I, D, N, S

DUTTA, T. K.

See BISWAS-DUTTA

ECKER, J\"{u}rgen

1. On the number of polynomial functions on nilpotent groups of class 2. Contributions to General Algebra 10, pp. 133--137, Verlag Johannes Heyn, Klagenfurt, 1998. C',Po
2. Functions On Finite Groups. Compatibility vs. Polynomiality. Dissertation, Linz, 2001. C',Po,T

See also AICHINGER-BINDER-ECKER-EGGETSBERGER-MAYR-N\"{O}BAUER, AICHINGER-BINDER-ECKER-N\"{O}BAUER-MAYR

EGERTON, Patricia A.

1. Nilpotency and near-rings. Diss. Teesside Polytechnic, England, 1981. N, E
2. Radicals of centralizer near-rings II, based on the group $T^4$. J. Inst. Math. Comput. Sci. Math. Ser 8 (1995), 185--192.

See also EGERTON-OSWALD

EGERTON, P., and OSWALD, A.

1. Radicals of centralizer near-rings I, Based on groups $D_4$ and $T_3$. J. Inst. Math. Comput. Sci. Math. Ser 8 (1995) 145--149.

EGGETSBERGER, Roland

1. Some topics in Frobenius groups, BIB-designs and coding theory. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 45--56. P'', X
2. Codes from field generated finite planar nearrings. Diploma Thesis, 1992, Univ. Linz, Austria. P'', X
3. Codes from some residue class ring generated finite planar nearrings. Institutsber. No. 467, 1993, Univ. Linz, Austria P'', X
4. On codes from residue class ring generated finite Ferrero pairs. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 113--122. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).
5. Circles and their interior points from field generated Ferrero pairs. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 237--246. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).

See also AICHINGER-BINDER-ECKER-EGGETSBERGER-N\"{O}BAUER-MAYR

ESCH, Linda Sue

1. Commutator and distributor theory in near-rings. Doctoral Diss., Boston Univ., 1974. D'

EVANS, Trevor

See EVANS-NEFF

EVANS, Trevor, and NEFF, M. F.

1. Substitution algebras and near-rings I. Notices Amer. Math. Soc. 11, November 1964. E

FAIN, Charles Gilbert

1. Some structure theorems for near-rings. Doctoral Diss., Univ. of Oklahoma, 1968. P, R, S, C, I, E, F, M, N

FAINA, Giorgio

1. A new class of $2$-transitive involutory permutation sets. Aequationes Math. 24 (1982), no. 2-3, 175--178. MR 85i:51026

FAUDREE, Ralph, Jr.

1. Groups in which each element commutes with its endomorphic images. Proc. Amer. Math. Soc. 27 (1971), 236--240. MR 42:4632 E'', X

FEIGELSTOCK, Shalom

1. Generalized nil 2-groups and near-rings. Indian J. Math. 22 (1980), 99--103. MR 86f:16040 A
2. A note on a paper of G. Mason. Canad. Math. Bull. 24 (1981), 247--248. H
3. Near-rings without zero divisors. Monatsh. Math. 95 (1983), 265--268. MR 84m:16034 W, I'
4. The near-ring of generalized affine transformations. Bull. Austral. Math. Soc. 32 (1985), 345--349. MR 87b:16039 E'', A'
5. On distributively generated near-rings. Math. Student 47 (1985), 141--148. MR 89m:16072 D
6. On simple d. g. near-rings. Post. Math. 42 (1984), 17--22. MR 86k:16033 D'', A, E
7. Nilpotent zero square near-rings. submitted. B, N, D
8. Additive groups of trivial near-rings. Acta Math. Hungar. 69 (1995), no. 1-2, 95--97.
9. Mapping near-rings of abelian groups. Houston J. Math. 23 (1997), no. 1, 29--32.
10. Distributively generated trivial near-rings. Acta Math. Hungar. 76 (1997), no. 1-2, 143--144.
11. E-Near-Rings. submitted. E, E"

See also FEIGELSTOCK-KLEIN

FEIGELSTOCK, Shalom, and KLEIN, Aaron

1. A functorial approach to near-rings. Acta Math. Acad. Sci. Hungar. 34 (1979), 47--57. MR 80i:16045 H, D, E'
2. Functorial radicals and non-abelian torsion. Proc. Edinb. Math. Soc. 23 (1980), 317--329. H, D, R
3. Generalized nil 2-groups and near-rings. Indian J. Math. 22 (1980), 99--103. D, _D
4. Functorial radicals and non-abelian torsion theory II. Proc. Edinb. Math. Soc. 26 (1983), no. 1, 1--6. H, D, R

FELGNER, Ulrich

1. Pseudo-finite near-fields. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 15--30. MR 88h:03042 F, X

FENZEL, William F.

1. Regular near-rings. M. S. Thesis, Univ. of South Carolina, 1973. R

F\'{e}rentinou-Nicolacopoulou, Jeanne

1. Anneaux corpomorphes. (French) Bull. Soc. Math. Gr\v{c}ce (N.S.) 17 (1976), 86--91.

FERRERO, Giovanni

1. Sulla struttura aritmetica dei quasi-anelli finiti. Atti Accad. Scienze Torino 97 (1963), 1114-1130. MR 30:1147 D, S'
2. Sui problemi ``tipo Sylow'' relativi ai quasi anelli finiti. Atti Accad. Scienze Torino 100 (1966), 643--657. MR 34:5952 S'
3. Due generalizzazioni del concetto di anello e loro equivalenza nell'ambito degli ``stems'' finiti. Riv. Mat. Univ. Parma 7 (1966), 145--150. MR 37:4129 A, Rs
4. Struttura degli ``stems'' p-singolari. Riv. Mat. Univ. Parma 7 (1966), 243--254. MR 37:4130 S', S, A
5. Classificazione e costruzione degli stems p-singolari. Ist. Lombardo Accad. Sci. Lett. Rend. A. 102 (1968), 597--613. MR 39:2814 S', R, S
6. Quasi anelli aritmeticamente notevoli. Oberwolfach, 1968. S', _D
7. Gli stems p-singolari con radicale proprio. Ist. Lombardo Accad. Sci. Lett A 104 (1970), 91--105. MR 44:2789 S', R
8. Stems planari e BIB-disegni. Riv. Mat. Univ. Parma (2) 11 (1970), 79--96. MR 47:1882 P'', I', A
9. Sui moltiplicatori (nel senso di Hall) e sui disegni ricchi di moltiplicatori. Atti Conv. Geom. Comb. Appl., Perugia (1970), 233--237. MR 49:5147 P''
10. Qualche disegno geometrico. Le Matematiche (Catania), 26 (1971), 356--377. MR 49:8886 P'', S'
11. Applicazioni geometriche degli stems planari. Oberwolfach, 1972. P''
12. Su certe geometrie gruppali naturali. Riv. Mat. Univ. Parma (3) 1 (1972), 97--111. MR 51:214 P''
13. Su una classe di nuovi disegni. Ist. Lombardo Accad. Sci. Lett. Rend. A 106 (1972), 419--430. MR 50:1911 P''
14. Osservazioni sugli elementi di prima categoria di un gruppo. Riv. Mat. Univ. Parma (3) 1 (1972), 1--14. MR 51:5787 X, P''
15. Deformazioni, raffinamente e composizioni di funzioni di Steiner (I). Riv. Mat. Univ. Parma (3) 1 (1972). MR 51:2937 Rs, F, P''
16. Gruppi di Steiner e sistemi fini. Le Matematiche 27 (1972), Fasc. 1. MR 48:1944 Rs, G, P''
17. Sui gruppi che ammettono funzioni di Steiner. Rend. Ist. di Matem. Univ. Trieste 4 (1972), Fasc. II, 1--15. MR 48:5883 Rs, G, P''
18. Sul radicale degli stems p-singolari. Atti Accad. Sci. Torino Cl. Sci. Fis. Mat. Natur. 107 (1973), 349--369. MR 48:4054 S', R
19. Sul gruppo additivo di uno stem p-singolare. Atti Accad. Sci. Torino Cl. Sci. Fis. Mat. Natur. 108 (1973/74), I: 353--366, II: 689--697. MR 53:610a, b A. S'
20. Su un problema relativo ai sistemi di Steiner disgiunti. Rend. Ist. di Mat. Univ. Trieste 7 (1975), Fasc. I, 1--7. MR 53:13424 Rs, G, P''
21. On a geometrical interpretation of distributivity. Oberwolfach, 1976. Rs, G
22. Sul semigruppo moltiplicativo di un quasi-anello. Atti Conv. di Teoria dei Semigruppi (Siena) (1982), 18--34. M', B, E
23. Sui quasi-anelli $\phi $-ciclici. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 37--50. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995.
24. $1$-generated near-rings. to be found on WWW, http://iami.mi.cnr.it/.
25. $\phi $-cyclic near-rings. (Italian) ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 51--63. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. MR 2000j:16071
26. Semigroups and minimality in nearrings. PU. M. A. 11 (2000), 457--469.

See also FERRERO - FERRERO-COTTI; FERRERO-GALLINA; FERRERO-SUPPA

FERRERO, Giovanni, and FERRERO-COTTI, Celestina

1. Near-rings and near-fields (ed.), Proc. Conf. San Benedetto del Tronto, Sept. 1989, Publ. Univ. Parma All from A to X
2. On a class of quasi-local near-rings. PU. M. A. 4 (1993), 297--309.
3. On certain extensions of quasirings. (Italian) Riv. Mat. Univ. Parma (5) 1 (1992), 57--63 (1993). MR 95a:16060
4. Quasi-anelli i cui ideali moltiplicativi sono sottogruppi. Quad. Dip. Mat. Univ. Parma n. 82 (1992).
5. Elementary remarks about the dilatations of a near-ring. (Italian) Riv. Mat. Univ. Parma (5) 3 (1994), no. 2, 333--339 (1995).
6. Cyclicity in dilatations. (Italian) Atti Sem. Mat. Fis. Univ. Modena 44 (1996), no. 1, 53--65. MR 97e:16096
7. Near-rings with particular Clay semigroups. (Italian) Matematiche (Catania) 51 (1996), suppl., 81--89 (1997). MR 98m:16056

FERRERO, Giovanni, and GALLINA, G.

1. Funzioni di Steiner con parecchi moltiplicatori, Riv. Mat. Univ. Parma (4) 4 (1978), 475--478.

FERRERO, Giovanni, and SUPPA, A.

1. Sistemi, anelloidi e funzioni di Steiner, Atti Sem. Mat. Fis. Univ. Modena 20 (1971), 272--280 (1972).

FERRERO-COTTI, Celestina

1. Una condizione di debole commutativit\`{a} per gli anelli. Riv. Mat. Univ. Parma (2) 10 (1969), 165--170. MR 45:8693 Rs
2. Sugli stems il cui prodotto \`{e} distributivo rispetta a se stesso. Oberwolfach, 1972. B, S, D'
3. Sugli stems il cui prodotto \`{e} distributivo rispetto a se stesso. Riv. Mat. Univ. Parma (3) 1 (1972), 203--220. MR 51:5676 B, S, D'
4. On near-rings containing a ring with an involution. Oberwolfach, 1976. B, Rs
5. Sugli stems in sui la corrispondenza $xy\to yx$ \`{e} una funzione. Rend. Acad. Sci. Fis. e Mat. Soc. Nat. Sci. Lett. Arti Napoli 44 (1977), 265--277. MR 58-:11031 E, S
6. Sugli stems in cui semigruppo moltiplicativo possiede un ideale con propriet\`{a} commutative deboli. Rend. Sem. Mat. Univ. Polit. Torino 6 (1977/78), 261--269. MR 80e:16024 M', E
7. Quozienti di stems rispetto a particolari annullatori. Riv. Mat. Univ. Parma 4(1978), 349--357 (1979). MR 80f:16038 E, P', A'
8. Sugli stems sul cui quadrato esiste una involuzione. Rend. Acad. Sci. Fis. e Mat. Soc. Nat. Sci. Lett. Arti Napoli 46 (1979), 177--188. MR 82a:16035 X, E
9. On critical or cocritical $\Omega $-groups. San Benedetto del Tronto, 1981, 151--156. Ua, X, E
10. Sulle involuzioni di certi stems. Riv. Mat. Univ. Parma 7 (1981), 89--104. MR 83m:16034a X
11. Radicali in quasi-anelli planari. Riv. Mat. Univ. Parma 12 (1986), 237--239. MR 88i:16043 R, P''
12. Sui quasi-anelli i cui ideali sono annullatori. Sem. Alg. Geom., Parma, 1985. E, N, I'
13. Near-rings with E-permutable translations. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 63--72. MR 88e:16053 E, B
14. On a class of Quasi-local near-rings. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 37--50. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995.
15. Nearrings with given semigroup of dilatations, PU. M. A. 11 (2000), 447--456.

See also FERRERO-COTTI - MORINI, FERRERO-COTTI - PELLEGRINI, FERRERO-COTTI - RINALDI, FERRERO-COTTI - SUPPA

FERRERO-COTTI, Celestina, and MORINI, F.

1. On nearrings in which the ideals are annihilators. Riv. Math. Univ. Parma 2 (1993), 1--10, (1994).

FERRERO-COTTI, Celestina, and PELLEGRINI, Silvia

1. On the homomorphic images of planar near-rings. Atti del Congresso su ``Sistemi binari e loro applicazioni", Taormina (Italy), 1978. P''

FERRERO-COTTI, Celestina, and RINALDI, Maria Gabriella

1. Sugli stems in cui ideali propri sono massimali. Riv. Mat. Univ. Parma (4) 6 (1980), 73--79. MR 82h:16027 E, S, X
2. Sugli stems in cui ideali sinistri (destri) propri sono massimali. Riv. Mat. Univ. Parma 7 (1981), 23--33. MR 84a:16065 E, S, X
3. Sugli stems in cui ideali propri sono primi. Rend. Sem. Mat. Univ. Politec. Torino 39 (1981/82), 123--130. MR 83f:16050 E, P'

FERRERO-COTTI, Celestina, and SUPPA, Alberta

1. Sugli stems con involuzione. Riv. Mat. Univ. Parma 7 (1981), 117--126. MR 83m:16034b X

FIORI, Carla

1. A class of nonordinary half-planes. Resultate Math. 17 (1990), no. 1-2, 78--82. MR 91b:51029

FITTING, Hans (1906-1938)

1. Die Theorie der Automorphismenringe abelscher Gruppen und ihr Analogon bei nicht kommutativen Gruppen. Math. Ann. 107 (1932), 514--524. E''

FOMIN, P. V.

1. On a type of generalized rings. Visnik Kiir. Univ. Ser. Mat. Mekh. no. 27 (1985), 114--115. MR 89c:16054 Rs

FONG, Yuen

1. Endomorphism near-rings of symmetric groups. Conf. Edinburgh., 1978. E''
2. The endomorphism near-rings of the symmetric groups. Diss. Univ. Edinburgh, 1979. E'', E, D, R, N, T
3. Endomorphism near-rings of a direct sum of isomorphic finite simple non-abelian groups. Conf. T\"{u}bingen, 1985. E''
4. A theorem on strictly semi-perfect near-ring modules. Math. Res. Center Rep., Symp. July 1982, R. O. C. H, S
5. Near-rings and automata. Proc. Nat. Sci. Council A 12 (1988), 240--246. Sy, E
6. On the structure of abelian syntactic near-rings. First Intern. Symp. Alg. Structures and Number Theory 1988, Hong Kong, World Scientific (1990), 114--123. MR 92d:16050 Sy, E, E''
7. Rings and near-rings generated by group mappings. Proc. First China-Japan Internat. Symp. on Ring Theory (Guilin, 1991), 46--48, Okayama Univ., Okayama, 1992. E, E''
8. Near-rings in China, Past and Present. in ``Rings, Groups and Algebra'', Lecture Notes in Pure and Appl. Math., vol. 181, pp. 97--132. Marcel Dekker, 1996. E, E'', D, R, N, T, Sy, Po, P', P'', Ua, S, X, Rs
9. Proc. Int'l Math. Conf. '94, Kaohsiung, Taiwan. (editor) World Sci., 1996.
10. Derivations in Near-Ring Theory. Contemp. Math. 264 (2000), 91--94.

See also BEIDAR-FONG-KE, BEIDAR-FONG-KE-LIANG, BEIDAR-FONG-KE-WU, BEIDAR-FONG-SHUM, BEIDAR-FONG-WANG, BOUCHARD-FONG-KE-YEH, CLAY-FONG, DE LA ROSA-FONG-WIEGANDT, FONG-HUANG-KE, FONG-HUANG-KE-YEH, FONG-HUANG-WANG, FONG-HUANG-WIEGANDT, FONG-KAARLI, FONG-KAARLI-KE, FONG-KE, FONG-KE-LEE, FONG-LI, FONG-MELDRUM, FONG-PILZ, FONG-VAN WYK, FONG-VELDSMAN-WIEGANDT, FONG-WIEGANDT, FONG-XU, FONG-YEH

FONG, Yuen, HUANG, F. K., and KE, Wen-Fong

1. Syntactic near-rings associated with group semiautomata. PU. M. A. 2, (1992), 187--204. MR 93i:16061 Sy, E, T
2. On minimal generating sets of $E(D_n)$, $A(D_n)$ and $I(D_n)$ with even n. Results in Math. 28 (1995), 53--62. E'', D

FONG, Yuen, HUANG, F. K., KE, Wen-Fong, and YEH, Yeong-Nan

1. On semi-endomorphisms of finite abelian groups and transformation near-rings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 72--78. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000). X, E

FONG, Yuen, HUANG, F. K., and WANG, C. S.

1. Group semiautomata and their related topics. Proc. Second Int. Coll. Words, Languages and Combin., Kyoto, World Scientific Publ., 155--169. Sy, E
2. Additive group semiautomata and syntactic near-rings. manuscript. Sy

FONG, Yuen, HUANG, F. K., and WIEGANDT, R.

1. Radical theory for group semiautomata. Acta Cynbernetica 11 (1994), 169--188. MR 94e Sy, R, S, E

FONG, Yuen, and KAARLI, Kalle

1. Unary polynomials on a class of groups. Acta Sci. Math. (Szeged) 64 (1995), 139--154. Po, E

FONG, Yuen, KAARLI, Kalle, and KE, Wen-Fong

1. On arithmetical varieties of near-rings. Archie der Mathematik 64 (1995), 385--392. E, Ua, P'
2. On minimal varieties of near-rings. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 123--132. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). E, Ua, P', P''

FONG, Yuen, and KE, Wen-Fong

1. On the minimal generating sets of the endomorphism near-rings of the dihedral groups $D_{2n}$ with odd $n$. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 64--67. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. D, E''
2. Syntactic near-rings of finite group-semiautomata. Proc. Conf. on Ordered. Structures and Alg. Computer Lang., Hong Kong, 1991, pp. 31--39. World Scientific, 1993. Sy, E, E''

FONG, Yuen, KE, Wen-Fong, and LEE, T. T.

1. On weakly syntactic near-rings. Prof. Int'l Math. Conf. '94, Kaohsiung, Taiwan, pp. 77--82. World Sci., 1996.

FONG, Yuen, KE, Wen-Fong, and WANG, C. S.

1. Syntactic near-rings. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 133--140. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). Sy, E
2. Nonexistence of derivations of transformation nearrings. Comm. Algebra 28 (2000), no. 3, 1423--1428.

FONG, Yuen, and LI, Fu-an

1. A realization of matrix near-rings. in ``Proc. Int'l Conf. on Semigroups and Their Related Topics''. Springer-Verlag, 140--148.

FONG, Yuen, and MELDRUM, John D. P.

1. The endomorphism near-rings of the symmetric groups of degree at least five. J. Austral. Math. Soc. 30A (1980), 37--49. MR 81j:16043 E'', D, E
2. The endomorphism near-rings of the symmetric group of degree four. Tamkang J. Math. 12 (1981), 193--203. MR 84a:16066 D, E'', E
3. Endomorphism near-rings of a direct sum of isomorphic finite simple non-abelian groups. in ``Near-Rings and Near-Fields" (ed.: G. Betsch), North-Holland, Amsterdam 1987, 73--78. MR 88e:16054 E''

FONG, Yuen, and PILZ, G\"{u}nter F.

1. Near-rings generated by semi-endomorphisms of groups. Contrib. Gen. Algebra 8, H\"{o}lder-Pichler-Tempsky, Wien (1991), Teubner, Stuttgart, 159--168. MR 92k:16058 E, X

FONG, Yuen, and VAN WYK, Leon

1. Semi-subgroups of finite abelian groups and semi-homomorphisms of rings and near-rings. manuscript.
2. Semi-homomorphisms of near-rings. Math. Pannonica 3/1 (1992), 3--17. MR 93d:16061 E, X

FONG, Yuen, VELDSMAN, Stefan, and WIEGANDT, Richard

1. Radical theory in varieties of near-rings in which the constants form an ideal. Commun. Alg. 21 (1993), 3369--3384. MR 94l:16052 R, S, Ua

FONG, Yuen, and WIEGANDT, Richard

1. Subdirect irreducibility and radicals. Quaestiones Math. 16 (1993), 103--113. R, S, Ua

FONG, Yuen, and XU, Yong Hua

1. Nonassociative and nondistributive rings. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 57--61. Rs

FONG, Yuen, and YEH, Yeong-Nan

1. Near-rings generated by infra-endomorphisms of groups. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 63--69. T, D

FRAY, R. L.

1. On group near-ring modules. Quaestiones Math. 15 (1992), 213--223. MR 93i:16062 E, X
2. On a relationship between group and matrix near-rings. Quaestiones Math. 15 (1992), 225--231. MR 93i:16063 M'', D, X
3. On group distributively generated near-rings. J. Austral. Math. Soc. (Series A) 52 (1992), 40--56. MR 93e:16061 M'', D, X
4. On ideals in group near-rings. Acta Math. Hungar. 74 (1997), 155--165. P', N, X
5. On sufficient conditions for near-rings to be isomorphic. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 141--144. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).
6. On direct decompositions in group near-rings. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 247--252. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
7. A note on pseudo-distributivity in group near-rings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 79--83. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

FREIBERGER, Helene

1. Fastringe. Hausarbeit, Techn. Univ. Wien, Austria, 1975. E

FREIDMAN, Pavel Abramovic

1. Distributively solvable near-rings. (Russian). Proc. of the Riga Seminar on Algebra, 297--309, Latv. Gos. Univ. Riga, 1969. MR 40:5670 D', N, R

FR\"{O}HLICH, Albrecht

1. Distributively generated near-rings I. Ideal Theory. Proc. London Math. Soc. 8 (1958), 76--94. MR 19:1156 D, D', E, N
2. Distributively generated near-rings II. Representation theory. Proc. London Math. Soc. 8 (1958), 95--108. MR 19:1156 D, I
3. The near-ring generated by the inner automorphisms of a finite simple group. J. London Math. Soc. 33 (1958), 95--107. MR 20:67 E'', D
4. On groups over a d. g. near-ring I. Sum constructions and free R-groups. Quart. J. Math. Oxford Ser. II (1960), 193--210. MR 22:11022 D, C, F', H
5. On groups over a d. g. near-ring II. Categories and functors. Quart. J. Math. Oxford Ser. II (1960), 211--228. MR 22:11023 D, H
6. Non-abelian homological algebra I. Derived functors and satellites. Proc. London Math. Soc. II (1961), 239--275. MR 26:1346A H, D
7. Non-abelian homological algebra II. Varieties, Proc. London Math. Soc. 12 (1962), 1--28. MR 26:1346B H, D
8. Non-abelian homological algebra III. The functors EXT and TOR. Proc. London Math. Soc. 12 (1962), 739--768. MR 26:1346C H, D
9. Some examples of near-rings. Oberwolfach, 1968. X, Po

FUCHS, Peter R.

1. The role of filters for describing substructures of transformation near- rings. Institutsber. No. 278, 1984, Univ. Linz, Austria C, T, X, E
2. Ultraproducts of $\Omega $-groups. Diss. Univ. Linz, Austria, 1985. MR 89e:03046 C, D, E, E', E'', M, P, P', P''
3. On the ideal structure in ultraproducts of affine near-rings. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 79--86. MR 88c:16048 A', E, X
4. Isomorphisms between lattices of filters and lattices of substructures in transformation near-rings. manuscript T, E, X
5. On near-rings in which the constants form an ideal. Bull. Austral. Math. Soc. 39 (1989), 171--175. MR 90e:16059 A', T
6. On function algebras in which every congruence is determined by a filter. J. Pure and Appl. Algebra 67 (1990), 259--267. MR 92b:08002 Ua, T, E
7. On pseudo-finite near-fields which have finite dimension over the center. Proc. Edinb. Math. Soc. 32 (1989), 371--375. MR 90h:12014 F, D'', X
8. On the structure of ideals in sandwich near-rings. Results in Math. 17 (1990), 256--271. MR 91e:16054 T, E, S
9. A decoding method for planar near-ring codes. Riv. Mat. Univ. Parma (4) 17. (1991), 325--331. MR 93g:16055 P'', X
10. A characterisation result for matrix rings. Bull. Austral. Math. Soc. 43 (1991), 265--267. MR 92a:16034 X
11. On the construction of codes by using composition. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 71--80. Po, X
12. Dense near-rings of continuous selfmaps in locally convex spaces. Results in Math. 30 (1996), 45--54. T', P, X
13. On modules which force homogeneous maps to be linear. Proc. Amer. Math. Soc. 128 (2000), no. 1, 5--15. T, X

See also FUCHS-HOFER-PILZ, FUCHS-KABZA, FUCHS-MAXSON, FUCHS-MAXSON-PILZ, FUCHS-MAXSON-SMITH, FUCHS-MAXSON-VAN DER WALT-KAARLI, FUCHS-MAXSON-PETTET-SMITH, FUCHS-PILZ

FUCHS, Peter R., HOFER, Gerhard, and PILZ, G\"{u}nter

1. Codes from planar near-rings. IEEE Trans. on Information Theory 36 (1990), 647--651. MR 91b:94028 P'', X

FUCHS, Peter R., and KABZA, Lucyna

1. On the simplicity of non-zerosymmetric near-rings over meromorphic products. Comm. Algebra 23 (1995), 185--199. MR 96e:16063 A, S, T

FUCHS, Peter R., and MAXSON, Carlton J.

1. Kernels of covered groups with operators. J. of Algebra 114 (1988), 68--80. MR 89e:20046 E'', X, G, S
2. Near-fields associated with invariant linear $\kappa $-relations. Proc. Amer. Math. Soc. 103 (1988), 729--736. MR 89f:16053 F, T, E
3. Meromorphic products determining near-fields. J. Austral. Math. Soc. A 46 (1989), 365--370. MR 90e:12022 T, F
4. Centralizer near-rings determined by PID-modules. Arch. Math. 56 (1991), 140--147. MR 92a:16052 T, E, S
5. Rings of homogeneous functions determined by Artinian ring modules. J. of Algebra, 176 (1995) 230--248. MR 96g:16060 T, R, S
6. When do maximal submodules force linearity?. J. Pure and Applied Alg. 141 (1999), 211--224. H, I, T, X

FUCHS, Peter R., MAXSON, Carlton J., and PILZ, G\"{u}nter F.

1. On rings for which homogeneous maps are linear. Proc. Amer. Math. Soc. 112 (1991), 1--7. MR 91h:16054 E'', T, X, E, I, S
2. Rings with FZP. Trans, Amer. Math. Soc. 349 (1997), 1269--1283. T, T', P

FUCHS, Peter R., MAXSON, Carlton J., and SMITH, K. C.

1. Centralizer near-rings determined by unions of groups. Results in Math. 11 (1987), 198--210. MR 88j:16046 T, S, P, F

FUCHS, Peter R., MAXSON, Carlton J., VAN DER WALT, Andries P. J., and KAARLI, Kalle

1. Centralizer near-rings determined by PID-modules, II. Periodica Math. Hung. 26 (2) (1993), 111--114. MR 94i:16021 T, R, S

FUCHS, Peter R., MAXSON, C. J., PETTET, M. R., and SMITH, K. C.

1. Centralizer near-rings determined by fixed point free automorphism groups. Proc. Royal Soc. of Edinburgh 107 A (1987), 327--337. MR 89a:16051 T, E, S

FUCHS, Peter R., and PILZ, G\"{u}nter

1. Ultraproducts and ultralimits of near-rings. Monatsh. Math. 100 (1985), 105--112. MR 87j:16016 C, H, P
2. A new density theorem for primitive near-rings. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 68--74. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. P, X

FUCHS, P. R., and VAN WYK, L.

1. On subrings of simple Artinian rings. Results Math. 24 (1993), no. 1-2, 49--65. MR 94g:16039

FURTW\"{A}NGLER, Philipp (1869-1940)

See FURTW\"{A}NGLER-TAUSSKY

FURTW\"{A}NGLER, Philipp, and TAUSSKY, Olga

1. \"{U}ber Schiefringe. Sitzber. Akad. Wiss. Wien, Math. Nat. Kl., Abt. IA, 145 (1936), 525. D, A

GABRIEL, Christian M.

1. On involution sets induced by neardomains. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 253--258. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).

GAIKWAD, Shri V.

See GAIKWAD-PAWAR

GAIKWAD, Shri V., and PAWAR, Y. S.

1. Covering conditions for completely prime ideals of a near-ring. submitted. P'

GALLINA, Giordano

1. Su certe relazioni di equivalenza nei quasi-anelli. San Benedetto del Tronto, 1981, 157--159. E, X
2. Ideali notevoli di certi quasi-anelli. Atti Sem. Mat. Univ. del Politecnico di Torino 40 (1982), 173--179. MR 86h:16036 B, E, N, I'
3. Extensions of strongly monogenic near-rings. Atti. Sem. Mat. Fis. Univ. Modena 33 (1984), 1--4. MR 87e:16094 E, X
4. Some equivalence relations for near-rings. Riv. Mat. Univ. Parma 10 (1984), 1--5. MR 87k:16039 E, F, P''
5. Sui radicali di un S-quasi-anello. Boll. Un. Mat. Ital. A (6) 4 (1985), 415--424. MR 87b:16040 R, N, B, F
6. Determination of some strongly monogenic near-rings. Boll. Un. Mat. Ital. D (6) 4 (1985), 123--130. MR 88a:16066 A, M'
7. Sistemi di annullatori nel quasi-anelli. Riv. Mat. Univ. Parma 11 (1985), 325--328. MR 87m:16063 E, N, B
8. Generalizations of strongly monogenic near-rings. Riv. Math. Univ. Parma (4) 12 (1986), 31--34. MR 89b:16046 A, C, F, P'', R, R', T
9. On the structure of some near-rings. Rend. Sci. Mat. Appl. Lombardo 121 (1987), 73--90. MR 90j:16082 B, E, P'', L
10. Sugli IFP-quasi-anelli con condizioni di finitezzia sugli $N$-sottogruppi. Quaderno n. 23 del Dipartimento di Mat. Univ. di Parma, 1987. B, P''
11. $H$-extensions, elevations of near-fields and $S$-near-rings. (Italian) Rend. Istit. Mat. Univ. Trieste 20 (1988), no. 2, 215--233 (1990). MR 91f:16055 P', F, D'', P'', E, L
12. Para special chains of near-rings. Rend. Circ. Mat. Palermo 36 (1987), 139--147. MR 90f:16051
13. Errata corrige: On the structure of some near-rings. Rend. Sci. Mat. Appl. Lombardo 122 (1988) i (1989), MR 91b:16053 B, E, P'', L
14. Dickson near-rings by constructed prolonging coupling maps. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 75--90. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995. MR 2000i:16093 Also: Pure Math. Apl. 5 (1996), 281--291 MR 96h:16051
15. Proprieta IFP. a ed S, Quaderno n. 95 del Dipartimento di Mat. Univ. di Parma, 1993. B, P''
16. Alcuni risultati numerativi sui quasi-anelli fortemente monogeni. Quad. Dip. Mat. Univ. Parma n. 1.
17. Sulle catene para-spoeciali di quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 14
18. Sulla struttura di alcuni quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 16.
19. Su un problema concernente i quasi-anelli locali. Quad. Dip. Mat. Univ. Parma n. 32.
20. Automi localmente gruppali ed L-spazi. Quad. Dip. Mat. Univ. Parma n. 41.
21. Proprieta' di quasi-anelli di Dickson. Quad. Dip. Mat. Univ. Parma n. 103.
22. Errata corrige ``Dickson near-rings construed by plounging coupling maps. Quad. Dip. Mat. Univ. Parma n. 117.
23. Sotto-quasi-anelli di quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 122.
24. Alcune osservazioni sui quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 125.
25. Alcuni quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 127.
26. Alcuni quasi-anelli 2. Quad. Dip. Mat. Univ. Parma n. 132.
27. Su alcuni BIBD a gruppo transitivo di automorfismi. Quad. Dip. Mat. Univ. Parma n. 133.
28. Alcuni quasi-anelli 3. Quad. Dip. Mat. Univ. Parma n. 138.
29. Alcuni quasi-anelli 4. Quad. Dip. Mat. Univ. Parma n. 146.
30. Alcuni quasi-anelli 5. Quad. Dip. Mat. Univ. Parma n. 159.
31. Alcuni quasi-anelli 6. Quad. Dip. Mat. Univ. Parma n. 171.
32. Alcuni quasi-anelli 7. Quad. Dip. Mat. Univ. Parma n. 180.
33. Subnearrings of Fr\"{o}hlich nearrings. (Italian) Riv. Mat. Univ. Parma (6) 2 (1999), 69--76 (2000).
34. Sotto-quasi-anelli di Quasi-anelli di Fr\"{o}hlich. Quad. Dip. Mat. Univ. Parma n. 197.
35. Gruppi di unitari in alcuni quasi-anelli. Quad. Dip. Mat. Univ. Parma n. 210.

GANESAN, N.

1. Finite near-rings with zero divisors and regular elements. Notices of the Amer. Math. Soc., August 1970, 70T-A168. A, C, D', E
2. A study of finite rings and near-rings. Doctoral Diss., Annamalai Univ., Tamil Nadu (India), 1971. X
3. Near-rings with zero divisors and regular elements. submitted. A, C, D', E

See also GANESAN-TAMIZH CHELVAM, DHEENA-GANESAN, GANESAN-SURYANARAYANAN

GANESAN, N., and SURYANARAYANAN, S.

1. On distributor and associator ideals in a near-ring. submitted. D', Rs
2. Stable and pseudo-stable near-rings. Indian J. Pure Appl. Math. 19 (1988), no. 12, 1206--1216. MR 89k:16070 X, E, F
3. Mate functions in a near-ring. submitted. E, X
4. On pseudo-stable near-rings. Bull. Malaysian Math. Soc. 12 (1989), 67--71. MR 91f:16061 P', E, S

GANESAN, N., and TAMIZH CHELVAM, T.

1. On bi-ideals of near-rings. Indian J. pure appl. Math. 18 (1987), 1002--1005. MR 88m:16041 I, D', F
2. On minimal bi-ideals of near-rings. J. of Indian Math. Soc. 53 (1988), no. 1-4, 161--166. MR 90h:16059
3. On isotopes of near-rings. Math. Student 56 (1988), 123--128 (1989). MR 90k:16041 Rs, X, P'
4. On finite non-associative near-rings. Math. Student 56 (1988), 195--200. MR 90j:17057 E, Rs
5. A generalization of prime ideals in non-associative near-rings. submitted. Rs, P', R'
6. Bi-ideals and regular near-rings. J. Ramanujan Math. Soc. 7 (1992), no. 2, 155--164.

GERBER, Gert K. (xxxx--1997)

1. Radicals of $\Omega $-groups defined by means of elements. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 87--96. R, Ua, E

See also BUYS-GERBER

GERLA, Giangiacomo

See GERLA-LETTIERI

GERLA, Giangiacomo, and LETTIERI, Ada

1. Near-fields of infinite dimension over their own nucleus. (Italian) Rend. Accad. Sci. Fis. Mat. Napoli (4) 46 (1979), 609--618 (1980). MR 82e:51008

GILBERT, Michael D.

1. Commutativity in rings and near-rings. M. S. thesis, Univ. of Southwestern Louisiana, Lafayette, 1972. X

GIRI, R. D.

See GIRI-MODI

GIRI, R. D., and MODI, A. K.

1. On commutativity of near-rings. Riv. Mat. Univ. Parma (5) 2 (1993), 279--282 (1994).
2. Some results on near-rings. Progr. Math. (Varanasi) 28/29 (1994/95), 51--58 (1996).

GODLOZA, Lungisile

See BOOTH-GODLOZA

GOIAN, I. M.

GOJAN, I. M.

GONSALVES, J. W.

See GONSALVES-GROENEWALD-OLIVIER

GONSALVES, J. W., GROENEWALD, M, and OLIVIER, Werner A.

1. Examples of substructures of near-rings. Publ. of the Univ. of Port Elizabeth, South Africa.

GONSHOR, Harry

1. On abstract affine near-rings. Pacific J. Math. 14 (1964), 1237--1240. MR 31:3456 A'

GONTINEAC, Viorel Michai

1. Pseudo-modules over near-rings and groups. An. Stiint. Univ. Ovidius Constanta Ser. Mat. 6 (1998), 61--73. MR 2000f:16059

GOPALAKRISHNAMOORTHY, G.

See CHANDRASEKHARA RAO-GOPALAKRISHNAMOORTHY

GORODNIK, Alexander

1. Local nearrings with commutative groups of units. Houston J. Math. 25 (1999), 223--234.

GORTON, R.

1. $\lambda $-complete near-rings. Fundamenta Math. 87 (1975), 73--78. MR 51:5677 P, R, S

GOUD, R. A.

1. On the theory of clusters. Trans. Amer. Math. Soc. 63 (1948), 482--513.

GOYAL, A. K.

1. Near-rings and topological near-rings. Diss. Sukhadia Univ., India, 1983. R', E, B, P', H, T', R, N, Q
2. D-strong and almost D-strong near-rings. Periodica Math. Hungarica 17 (1) (1986), 13--20. MR 87f:16031 E, P', P
3. Strictly $\pi $-regular near-rings. Studi Sci. Math. Hungar. 23 (1988), no. 1-2, 53--60. MR 89m:16073 R', E
4. A characterization of prime radical in near-rings under chain conditions on annihilators. Periodica Math. Hungar. 24 (3) (1992), 193--196. MR 93h:16074 P, P', R, E, N

See also CHOUDHARY-GOYAL

GOYAN, I. M.

1. The Baer radical of near-rings. (Russian). Bul. Akad. \v{S}tiince RSS Moldoven 1966, no. 4, 32--38. MR 34:7590 R, S, D

See also GOYAN-MARIN

GOYAN, I. M., and MARIN, V. G.

1. Matrices over near-rings. Proc. Conf. Alg. Cluj-Napoca, 1991, 29--30. E, M''
2. On strongly regular near-rings. Izv. Akad. Nauk Respub. Moldova Mat. 94(2), 52--55, 97, 101. R'
3. Prime and primary ideals in near-rings. Izv. Akad. Nauk Respub. Moldova Mat. 1997, no. 1, 117--121, 133, 135.
4. Ideals in regular near-rings. Izv. Akad. Nauk Respub. Moldova Mat. 1997, no. 3, 27--33, 105, 109.

GRAINGER, Gary

1. Left modules for left nearrings. Dissertation, Univ. of Arizona, Tucson, USA, 1988. X, E

See also CLAY-GRAINGER

GRAVES, James A.

1. Near-domains. Doctoral Diss., Texas A\&M University, 1971. I', Q', E'

See also GRAVES-MALONE

GRAVES, James A., and MALONE, Joseph J.

1. Embedding near-domains. Bull. Austral. Math. Soc. 9 (1973), 33--42. MR 48:4055 I', Q', E'
2. Near domains as generalizations of D-rings. Amer. Math. Monthly 82 (1975), 491--493. MR 51:3232 I', Po
3. Euclidean near domains. manuscript. I', D, Po

GRAY, Mary W.

1. A radical approach to algebra. Addison-Wesley, Reading, Mass. 1969, ch. 6, 120--122. R, S, I

GRINGLATZ, L. Ja.

1. Locally nilpotent near-rings. (Russian). Mat. Sap. Ural. Gos. Univ. 5 (1965), 35--42. MR 33:7383 N

GROENEWALD, Nico J.

1. A note on semi-prime ideals in near-rings. J. Austral. Math. Soc. 35 (1983), 194--196. MR 85h:16044 P'
2. Strongly semi-prime ideals in near-rings. Chin. J. Math. 11 (1983), 221--227. MR 85d:16030 P', N
3. The completely prime radical in near-rings. Acta Math. Hungar. 51 (1988), 301--305. MR 89g:16044 P', R, N
4. The strongly prime radical in near-rings. submitted. P', R, N
5. Note on the completely prime radical in near-rings. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 97--100. MR 88d:16022 P', R
6. Strongly prime near-rings. Proc. Edinb. Math. Soc. 31 (1988), 337--343. MR 89i:16033 P', R
7. Strongly prime near-rings II. Comm. Algebra 17 (1989), 735--749. MR 89m:16074 P', R
8. Different prime ideals in near-rings. Comm. Algebra 19 (1991), 2667--2675. MR 92m:16070 P', P, R, X
9. On some special classes of near-rings. In `` Rings, modules and radicals (Hobart, 1987), " 72--77 (Pitman Res. Notes Math. Ser., 204.) Longman Sci. Tech., Harlow, 1989. MR 91b:16054
10. Regularity conditions and the simplicity of prime factor near-rings. submitted. R', P', S
11. Superprime near-rings. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 259--268. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
12. The almost nilpotent radical for near-rings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 84--93. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).
13. Strongly semiprime nearrings. Algebra Colloq. 6 (1999), 33--43. P', R

See also BIRKENMEIER-GROENEWALD, BOOTH-GROENEWALD, BOOTH-GROENEWALD-VELDSMAN, GROENEWALD-OLIVIER, GROENEWALD-POTGIETER

GROENEWALD, Nico J., and OLIVIER, Werner A.

1. On regularities in near-rings. Acta. Math. Hungar. 74 (1997), 177--190. P', R, S, R'

GROENEWALD, Nico J., and POTGIETER, P. C.

1. A generalization of prime ideals in near-rings. Comm. Algebra 12 (1984), 1835--1853. P'
2. A note on the Levitzki radical of a near-ring. J. Austral. Math. Soc. A 36 (1984), 416--420. MR 85j:16057 R, P', N
3. On uniformly strongly prime near-rings. Comm. Algebra 19 (1991), no. 10, 2667--2675. MR 91g:16036 R, P', Ua
4. A generalization of regularities in near-rings. Comm. Algebra 17 (1989), no. 6, 1449--1462. MR 90e:16060 R'

GR\"{O}GER, Detlef

1. On ordered near-fields. (German). San Benedetto del Tronto, 1981, 73--81. F, O
2. \"{U}ber angeordnete Fastk\"{o}rper. Beitr\"{a}ge zur Geometrie und Algebra Nr. 7, Techn. Univ. M\"{u}nchen, 1982. F, O, P''
3. Einbettbarkeit von reell-bewerteten Fastk\"{o}rpern in planare. Beitr\"{a}ge zur Geometrie und Algebra, Nr. 8, Techn. Univ. M\"{u}nchen, 1982, 5--10. O, V, F, P''
4. Embedding of near-fields with real valuations into planar near-fields. Results in Math. 7 (1984), 58--62. V, F, P'', D''
5. Remarks on Galois theory in near fields. (German). Resultate Math. 6 (1983), no. 1, 36--39. MR 85e:12011
6. On ordered near-fields. (German). Beitr\"{a}ge zur Geometrie und Algebra, 7. Technische Universit\"{a}t M\"{u}nchen, Institut f\"{u}r Mathematik und Informatik, Munich, 1982. 84 pp. MR 84c:12018
7. Couplings on a quadratic number field and a basis of its norm group. (German). Aequationes Math. 39 (1990), no. 2-3, 167--178. MR 92c:11112
8. A remark on the orderability of nearfields. (German). J. Geom. 61 (1998), no. 1-2, 53--55.

GROVES, Susan Dancs

1. The sub-near-field structure of finite near-fields. Bull. Austral. Math. Soc. 5 (1971), 275--280.
2. On finite Dickson near-fields. Abh. Math. Sem. Univ. Hamburg 37 (1972), 254--257.
3. Locally finite near-fields. Abh. Math. Sem. Univ. Hamburg 48 (1979), 89--107. MR 80f:12027

GRUNDH\"{O}FER, Theo

1. On p-adic near-fields. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 101--104. MR 88c:16049 F, E
2. Transitive linear groups and near-fields with solubility conditions. J. Algebra 105 (1987), 303--307. MR 88a:12009 D'', F
3. Sharply transitive linear groups and near-fields over p-adic fields. Forum Math. 1(1989), 81--101. F, E, S''
4. Projektivitatengruppen von Ebenen uber endlichen Semikorpern. J. Geom. 40 (1991), 74--76. MR-92i-51014.
5. Finite subplanes and affine projectivities of translation planes. Mitt. Math. Sem. Giessen No. 164 (1984), 179--184. MR 86a:51005

See also GRUNDH\"{O}FER-ZASSENHAUS

GRUNDH\"{O}FER, Thomas, and ZASSENHAUS, Hans

1. A criterion for infinite non-Dickson near-fields of dimension two. Res. Math. 15 (1989), 221--226. MR 90e:12023 F

GUERCIA, Liana Dipartimento di Matematica:: UniversitÕ di Lecce:: 73100 Lecce:: ITALY

See GUERCIA-LENZI

GUERCIA, Liana, and LENZI, Domenico

1. Su una generalizzazione del concetto di quasi-corpo associativo. Atti Accad. Naz. Lincei Rend. Cl. Sci. Fis. Mat. Natur. (8) 57 (1974), no. 5, 311--315 (1975). MR 53:8032

GUPTA, N. D.

1. Commutation near-rings of a group. J. Austral. Math. Soc. 7 (1967), 135--140. MR 35:2965 D'

GUSEV, A. I.

1. Some questions of the theory of modules over topological semifields. (Russian). Application of functional analysis in approximation theory, No. 6, pp. 17--34. Kalinin. Gos. Univ., Kalinin, 1975.

GUTHRIE, Edgar R.

1. The endomorphism near-ring on $D_8$. M. S. Thesis, Texas A\&M Univ., College Station, 1969. E'', A

GUTI\'{E}RREZ, Jaime G.

1. The ring of the distributive elements in near-rings of formal power series. Proc. XIIth Portuguese-Spanish Conf. on Mathematics, Vol. II (Portuguese) (Braga, 1987), 92--96, Univ. Minho, Braga, 1987. MR 92g:00024 Po, D'
2. Algunos aspectos de la teoria de casi-anillos de polinomios. Diss. Univ. de Cantabria, Santander (Spain), 1988. Po, D', D, R, E, X
3. A note on indecomposable elements in the near-rings of formal power series. Riv. Mat. Univ. Parma, Vol. (4) 16 (1990), 161--165. MR 92c:16041 Po, E, X
4. A polynomial decomposition algorithm over factorial domains. Dep. Math. Est. y Computaci\'{o}n. Univ. de Cantabria Tec. Report, Num. 5 (1989). Po, X
5. A polynomial decomposition algorithm over factorial domains. C. R. Math. Rep. Acad. Sci. Canada 13 (1991), no. 2-3, 81--86. MR 92f:13022
6. Distributor ideals in near-rings of polynomials. Archiv der Math. 55 (1990), no. 6, 537--541. MR 91j:16059 D', Po
7. The functional decomposition of polynomials. Publications Math. de l'Universit\'{e} Paris VII. Structures Algebriques Ordonn\'{e}es 1989--1990. Po
8. Rings in the near-ring of formal power series. Period. Math. Hungar. 23 (1991), no. 1, 1--4. MR 93a:16037 Po, D', D''
9. Ideals in the near-ring of polynomials. ``Near-rings and near-fields" (Oberwolfach, 1989), pp. 91--94. Math. Forschungsinst. Oberwolfach, Schwarzwald, 1995.

See also ALONSO-GUTI\'{E}RREZ-RECIO, GUTI\'{E}RREZ-OLAZ\'{A}BAL-VELASCO, GUTI\'{E}RREZ-RECIO-RUIZ DE VELASCO, GUTI\'{E}RREZ-RUIZ DE VELASCO

GUTI\'{E}RREZ, Jaime G., OLAZ\'{A}BAL, J. M., and RUIZ DE VELASCO, Carlos

1. An implementation in REDUCE of a polynomial decomposition algorithm. submitted. Po, E

GUTI\'{E}RREZ, Jaime G., RECIO, Tomas, and RUIZ DE VELASCO, Carlos

1. Polynomial decomposition algorithm of almost quadratic complexity. Lec. Notes, in Computer Science 357, Springer-Verlag (1989), 471--476. Po, E

GUTI\'{E}RREZ, Jaime G., and RUIZ DE VELASCO, Carlos

1. Distributive elements in the near-rings of polynomials. Proc. Edinb. Math. Soc. 32 (1989), 73--80. Po, D'
2. A polynomial decomposition algorithm. Proc. II SBWAG (Santiago de Compostela 1989) Alxebra. 54 (1990), 75--90. MR 91g:12012 Po
3. Distributive elements in the near-ring of polynomials. Proc. Edinb. Math. Soc. 32 (1989), 73--80. MR 89m:16075 Po, D'
4. Ideals in the near-rings $Z[X]$ of polynomials. In ``Proceedings of the XIVth Spanish-Portuguese Conference on Mathematics, Vol. I--III (Spanish) (Puerto de la Cruz, 1989),'' 63--67. Univ. La Laguna, La Laguna, 1990. MR 92b:00044 Po, E
5. Polynomial near-rings in several variables. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 94--102. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

HAD\v{Z}IEV, D\v{z}.

See HAD\v{Z}IEV-SARYMSAKOV

HAD\v{Z}IEV, D\v{z}., and SARYMSAKOV, T. A.

1. Topological modules over semifields of the first kind. (Russian) Dokl. Akad. Nauk SSSR 200 (1971), 1041--1043.

HA\u{I}MULIN, Ju. N.

1. Geometric interpretation of a quasifield. (Russian). Current problems of geometry and its applications, pp. 45--47, 107, Chuvash. Gos. Univ., Cheboksary, 1975. MR 81c:12041

HANKE, Klaus Ulrich

1. Dicksonsche Fastk\"{o}rper mit lokalem Grundk\"{o}rper. Diss. Techn. Univ. M\"{u}nchen, 1983. D'', F

See also HANKE-W\"{A}HLING

HANKE, Klaus Ulrich, and W\"{A}HLING, Heinz

1. Construction of locally compact nearfields. (German). J. Geom. 39 (1990), no. 1-2, 92--115. MR 92b:12017

HANSEN, D. J.

See HANSEN-LUH

HANSEN, D. J., and LUH, Jiang

1. Boolean near-rings and weak commutativity. J. Austral Math. Soc. Ser A 47 (1989), no. 1, 103--107. MR 90e:16061 B

HANSON, Jill

See HANSON-KALLAHER

HANSON, Jill, and KALLAHER, Michael J.

1. Finite Bol quasifields are nearfields. Utilitas Math. 37 (1990), 45--64. MR 92b:51024

HARDY, F. Lane

1. Groups and near-rings. manuscript.

See also ARMENTROUT-HARDY-MAXSON

HARTMANN, Erich

1. On two classes of Tits nearfields. (German). Mitt. Math. Ges. Hamburg 10 (1980), no. 8, 757--762. MR 86c:12006 F, S'',G, Rs
2. Minkowski planes with the property of transitivity. (German). Resultate Math. 5 (1982), no. 2, 136--148. MR 84d:51009

HARTMANN, Peter

See HARTMANN-PRIESS-CRAMPE

HARTMANN, Peter, and PRIESS-CRAMPE, Sibylla

1. On the construction of ordered planar Dickson near-fields. (German). Geom. Dedicata 36 (1990), no. 2-3, 199--205. MR 91j:12021 D'', O, F

HARTNEY, J. F. T.

1. On the radical theory of near-rings. M. S. Thesis, Univ. of Nottingham, 1968. P, R, S, D
2. On the radical theory of a distributively generated near-ring. Math. Scand. 23 (1968), 214--220. MR 40:4311 P, R, S, D
3. Generalizations of the critical ideal of a near-ring. Conf. Edinburgh, 1978. R, P, D, I
4. Radicals and antiradicals in near-rings. Diss. Univ. Nottingham, 1979. R, P, N, I
5. A radical for near-rings. Proc. Roy. Soc. Edinb., Sect. A, 93, 1982/83, 105--110. MR 84a:16067 R, D
6. An antiradical for near-rings. Proc. Roy. Soc. Edinb., Sect. A, 96 (1984), 185--191. MR 85i:16048 R, M
7. On the decomposition of the s-radical of a near-ring. Proc. Edinb. Math. Soc. 33 (1990), 11--22. MR 91a:16030 R, S, P
8. $s$-primitivity in matrix near-rings. Quaestiones Math. 18 (1995), 487--500. MR 96h:16052

See also HARTNEY-MAVHUNGU

HARTNEY, J. F. T., and MAVHUNGU, S.

1. s-Primitive ideals in matrix near-rings. ``Nearrings and Nearfields" (Stellenbosch, 1997), pp. 103--107. Kluwer Acad. Publ., Dordrecht, the Netherlands, (2000).

HAUSEN, Jutta

See ALBRECHT-HAUSEN, HAUSEN-JOHNSON

HAUSEN, Jutta, and JOHNSON, Johnny A.

1. Centralizer near-rings that are rings. J. Austral. Math. Soc. (Series A) 59 (1995), 173--183. T

HEATHERLY, Henry E.

1. Embedding of near-rings. Doctoral Diss., Texas A\&M University, College Station, 1968. T, E', S, A, D, Rs
2. C-Z transitivity and C-Z decomposable near-rings. J. Algebra 19 (1971), 496--508. MR 44:5349 E, A', R, S, A
3. One-sided ideals in near-rings of transformations. J. Austral. Math. Soc. 13 (1972), 171--179. MR 46:219 T, S
4. Matrix near-rings. J. London Math. Soc. (2) 7 (1973), 355--356. MR 48:8573 _D, M''
5. Near-domains of composite characteristic. Elem. Math. 28 (1973), 151--152. MR 48:11220 I', A
6. Distributive near-rings. Quart. J. Math. Oxford Ser. (2) 24 (1973), 63--70. MR 47:5057 _D, N, A
7. Near-rings without nilpotent elements. Publ. Math. Debrecen 20 (1973), 201--205. MR 48:11221 W, R', I', B, Po
8. Regular near-rings. J. Indian Math. Soc. 38 (1974), 345--354. MR 53:3035 R'
9. Semiring multiplications on commutative monoids. Publ. Math. Debrecen 21 (1974), 119--123. MR 50:9986 Rs, _D, A
10. The additive group of a finite near-field is elementary abelian. Kyungpook Math. J. 18 (1978), 3--4. MR 58:16621 F, A
11. Negative d. g. near-rings. Notices Amer. Math. Soc. 25 (1), January 1978. D, D', N
12. Near-rings on simple groups. Conf. Edinburgh, 1978. A, R
13. Idempotents in the near-ring $M(G)$. Amer. Math. Soc. Notices 80T-A186, 1980. T, I
14. Localized distributivity conditions. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 13--30. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995). D, _D, R, S

See also BIRKENMEIER-HEATHERLY, BIRKENMEIER-HEATHERLY-KEPKA, BIRKENMEIER-HEATHERLY-LEE, BIRKENMEIER-HEATHERLY-PILZ, COURVILLE-HEATHERLY, HEATHERLY-JONES, HEATHERLY-LEE, HEATHERLY-LEE-WIEGANDT, HEATHERLY-LIGH, HEATHERLY-MALONE, HEATHERLY-MELDRUM, HEATHERLY-OLIVIER, HEATHERLY-OLIVIER-PILZ, HEATHERLY-PILZ, HEATHERLY-STONE, HEATHERLY-YEARBY

HEATHERLY, Henry E., and JONES, Pat

1. Distributive near-rings II. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 15--18. D, _D, E, E', X

HEATHERLY, Henry E., and LEE, Enoch

1. Primitivity in near-rings with localized distributivity conditions. Quaestiones Math. 19 (1996), 527--536. P, R, D, A

HEATHERLY, Henry E., LEE, Enoch, and WIEGANDT, R.

1. Involutions on universal algebras. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 269--282. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997). D, Ua, X

HEATHERLY, Henry E., and LIGH, Steve

1. Pseudo-distributive near-rings. Bull. Austral. Math. Soc. 12 (1975), 449--456. MR 51:8181 _D, Po, R', A

HEATHERLY, Henry E., and MALONE, Joseph J.

1. Some near-ring embeddings. Quart. J. Math. Oxford Ser. 20 (1969), 81--85. MR 39:265 E', D
2. Some near-ring embeddings II. Quart. J. Math. Oxford Ser. 21 (1970), 445--448. MR 42:6053 E', D

HEATHERLY, Henry E., and MELDRUM, J. D. P.

1. Finiteness conditions for near-rings. Bull. Canad. Math. Soc. 35 (1992), 492--496. MR 93j:16034

HEATHERLY, Henry E., and OLIVIER, Horace

1. Near integral domains. Monatsh. Math. 78 (1974), 215--222. MR 51:5678 I', A
2. Near integral domains II. Monatsh. Math. 80 (1975), 85--92. MR 53:3036 I', A, S'
3. H-monogenic near-rings. submitted. I', D, A

HEATHERLY, Henry E., OLIVIER, Horace, and PILZ, G\"{u}nter

1. H-integral near-rings. Math. Pannonica 3 (1992), 43--50. I', R, D

HEATHERLY, Henry E., and PILZ, G\"{u}nter

1. On the structure of tame near-rings. J. Austral. Math. Soc. 50 (1991), 316--319. MR 92a:16053 X, P, R, T

HEATHERLY, Henry E., and STONE, Edward H.

1. Structure of Boolean near-rings. submitted. B, I, E, D'

HEATHERLY, Henry E., and YEARBY, Robert

1. Distributive near-rings II. submitted. _D

HEBISCH, Udo

1. $(2, 2)$ Algebren mit euklidischen Algorithmen. Diss. Techn. Univ. Clausthal, 1984. Ua, I', D, Po
2. The Kleene theorem in countably complete semirings. Bayreuth. Math. Schr. No. 31 (1990), 55--66. MR 91i:68104

See also HEBISCH-WEINERT

HEBISCH, Udo, and WEINERT, Hanns Joachim

1. Euclidean seminear-rings and near-rings. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 105--122. MR 88f:16042 Rs, E
2. Generalized semigroup semirings which are zerodivisor free or multiplicatively left cancellative. MR 93a:16041 Rs
3. Eine algebraische Theorie unendlicher Summen mit Anwendungen auf Halbgruppen und Halbringe. MR 93e:16062 Rs
4. Semirings and semifields. Handbook of Algebra, vol. 1 (ed.: M. Hazewinkel), North Holland, Amsterdam, 1994. Rs, E, F

HEEREMA, Nickolas

1. Sums of normal endomorphisms. Trans. Amer. Math. Soc. 84 (1957), 137--143. MR 18:559 E''

HEISE, Werner

1. Finite sharply multiply transitive sets of permutations. Conf. Edinburgh, 1978. S''

HELLER, Isidore

1. On generalized polynomials. Rep. Math. Colloqu. 2 (1948), 58--60, Notre Dame, Indiana, USA. MR 10:674 Po, Cr

HILBERT, David (1862-1943)

1. \"{U}ber den Zahlbegriff. Jahresber. Dt. Math. Ver. 8 (1899), 180--184. E, A, _D

HILL, Paul.

1. Endomorphism rings generated by units. T. A. M. S. 141 (1969), 99--105. E''

HILLE, Monika

See HILLE-WEFELSCHEID

HILLE, Monika, and WEFELSCHEID, Heinrich

1. Sharply 3-transitive groups generated by involutions. J. Discrete Math. (1986) F, S''

HIRAMINE, Yutaka

See HIRAMINE-JOHNSON

HIRAMINE, Yutaka, and JOHNSON, Norman L.

1. Generalized Andr\'{e} planes of order $p\sp t$ that admit a homology group of order $(p^t-1)/2$. Geom. Dedicata 41 (1992), no. 2, 175--190. 92m:51016
2. Near nearfield planes. Geom. Dedicata 43 (1992), no. 1, 17--33. MR 93f:51020

HOFER, Gerhard

1. Radikale von Fastringen linearer Halbautomaten. Institutsbericht Nr. 257, Math. Inst. Univ. Linz, 1984. R, A', Sy, E
2. Ideals and reachability in machines. in ``Near-Rings and Near-Fields'' (G. Betsch, ed.), North-Holland 1987, 123--131. Sy, E
3. Near-rings and group automata. Doctoral Diss., Univ. Linz, 1986. MR 89j:16052 R, Sy, E, A'
4. Radicals and reachability in machines. in ``Near-Rings and Near-Fields'' (ed.: G. Betsch), North-Holland, Amsterdam 1987, 123--132. R, Sy, E, A'
5. Syntactic rings. Res. Math. 15 (1989), 245--254. MR 90e:16028 Sy, E
6. Left ideals and reachability in machines. Theor. Computer Science 68 (1989), 49--56. MR 91c:68096 Sy, E
7. Reachability in machines. in ``Rings, Modules and Radicals'' (B. Gardner, ed.), Longman Pitman, London 1989, 88--96. MR 90j:18005 Sy, E
8. Automata applied to information theory. Intern. Conf. on Operation Theory (GM\"{O}OR), to appear. Sy, E
9. Near-rings and formal languages. submitted. Sy, X

See also FUCHS-HOFER-PILZ, HOFER-PILZ

HOFER, Gerhard, and PILZ, G\"{u}nter

1. Near-rings and automata. Proc. Conf. Univ. Algebra, Klagenfurt (Austria) (1982), Teubner, 1983, 153--162. Sy, A', D, P

HOFER, Robert D.

1. Restrictive semigroups of continuous self-maps on arcwise connected spaces. Proc. London Math. Soc. 25 (1972), 358--384. MR 47:9582 T', E
2. Restrictive semigroups of continuous functions on 0-dimensional spaces. Canadian J. Math. 24 (1972), 598--611. MR 45:5983 T', E
3. Simplicity of near-rings of continuous functions on topological groups. Oberwolfach, 1972. S, T, T'
4. Simplicity of right distributive systems of functions on groupoids. manuscript. Rs, S
5. Near-rings of continuous functions on disconnected groups. J. Austral. Math. Soc. A, 28 (1979), 433--451. MR 81b:16026 T', S

See also HOFER-MAGILL

HOFER, R. D., and MAGILL, K. D.

1. On the simplicity of sandwich near-rings. Acta Math. Hungar. 60 (1992), no. 1-2, 51--60. MR 93i:16064 T, S, E

HOLCOMBE, Wm. Michael Lloyd

1. A class of 0-primitive near-rings. Oberwolfach, 1968. P, T
2. Primitive near-rings. Doctoral Diss., University of Leeds, 1970. P, T, R, Q'
3. Endomorphism near-rings in general categories. Oberwolfach, 1972. H, F, T
4. A class of 0-primitive near-rings. Math. Z. 131 (1973), 251--268. MR 51:8182 P, T, R
5. Representations of 2-primitive near-rings and the theory of near-algebras. Proc. Royal Irish Acad. Sect. A 73 (1973), 169--177. MR 48:2195 P, T, R, Rs
6. Near-rings of quotients of endomorphism near-rings. Proc. Edinb. Math. Soc. (2) 19 (1974/75), 345--352. MR 53:5674 Q', E''
7. Special radical functors. Oberwolfach, 1976. R, H
8. Categorial representations of endomorphism near-rings. J. London Math. Soc. (2) 16 (1977), 21--37. MR 57:3197 H, E'', E', P, R
9. Holonomy group decomposition of near-rings. Conf. Edinburgh, 1978. X, I
10. Holonomy decomposition of near-rings. Proc. Edinb. Math. Soc. 23 (1980), 43--48. MR 81m:16038 X, I
11. Near-rings associated with automata. San Benedetto del Tronto, 1981, 163--166. Sy, A', Po
12. A hereditary radical for near-rings. Studia Sci. Math. Hungar. 17 (1982), 453--456. MR 85i:16049 R, S
13. The syntactic near-ring of a linear sequential machine. Proc. Edinb. Math. Soc. 26 (1983), 15--24. MR 84d:16046 Sy, A', D, Po
14. Linear recognition sequences. Conf. Near-Rings and Near-Fields, Harrisonburg, Virginia, 1983, 19--20. Sy
15. A radical for linear sequential machines. Proc. Royal Irish Acad. 84 A (1984), 27--35. MR 86g:68125 Sy, R, A', N
16. Decompositions of linear sequential machines and constructions for affinely generated near-rings. submitted. Sy, A'

See also HOLCOMBE-WALKER

HOLCOMBE, Wm. Michael Lloyd, and WALKER, Roland

1. Radicals in categories. Proc. Edinb. Math. Soc. 24 (1978), 111--128. MR 80b:18009 R, H

HONGAN, Motoshi

1. Note on strongly regular near-rings. Proc. Edinb. Math. Soc. 29 (1986), 379--381. MR 87k:16040 R', B, N
2. On near-rings with derivation. Math. J. Okayama Univ. 32 (1990), 89--92. MR 92c:16042 P', D, E, X

HOTJE, Herbert

1. Kinematic groups constructed by near-rings. in ``Proceedings of the 3rd Congress of Geometry (Thessaloniki, 1991),'' 206--211, Aristotle Univ. Thessaloniki, Thessaloniki, 1992. MR 93f:51021
2. Fibered incidence loops by neardomains. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 283--286. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).

HUANG, Feng-Kuo

1. Semidirect sum of groups in which endomorphisms are generated by inner automorphisms. Proc. Amer. Math. Soc., to appear.

See also BIRKENMEIER-HUANG, BIRKERMEIER-HUANG-KIM-PARK, FONG-HUANG-KE, FONG-HUANG-KE-YEH, FONG-HUANG-WANG, FONG-HUANG-WIEGANDT

HULE, Harald

1. Polynome \"{u}ber universalen Algebren. Monatsh. Math. 73 (1969), 329--340. Po, S, Ua

See also HULE-M\"{U}LLER, HULE-PILZ

HULE, Harald, and M\"{U}LLER, Winfried

1. On the compatibility of algebraic equations with extensions. J. Austral. Math. Soc. 21 (1976), 381--383. Ua, Po, X

HULE, Harald, and PILZ, G\"{u}nter

1. Algebraische Gleichungssysteme \"{u}ber universellen Algebren. Institutsber. Nr. 306, Math. Inst. Univ. Linz, 1986. E, Po, Ua, X
2. Equations over abelian groups. in: Contrib. to Gen. Algebra IV, Teubner, Stuttgart-Wien, 1987. E, E'', Po, X

HUPPERT, Bertram

See BLACKBURN-HUPPERT

HUQ, Syed A.

1. Right abelian categories. Rend. Sc. Fis. Mat. e Nat. Lincei 50 (1971), 284--289. H
2. Embedding problems, module theory and semi-simplicity of semi-near-rings. Ann. Soc. Sci. Bruxelles Ser. I 103 (1989), no. 1, 49--62 (1990). MR 91i:16078 Rs, E', S

See also AIJAZ-HUQ

HUR, Chang Kyu

See HUR-KIM

HUR, Chang Kyu, and KIM, Hee Sik

1. On fuzzy relations of near-rings. Far East J. Math. Sci. 1997, Special Volume, Part II, 245--252.

HUSSAIN, Imdad

1. On characterizing complete quasi near-fields. Riazi J. Karachi Math. Assoc. 12 (1990), 31--38.

IDZIAK, Pawel M.

See AICHINGER-IDZIAK

IL'INYKH A. P.

1. Finite neofields and $2$-transitive groups. (Russian). Algebra i Logika 36 (1997), no. 2,166--193, 240 translation in Algebra and Logic 36 (1997), no. 2, 99--116. MR 98m:12004

ISTINGER, M.

See ISTINGER-KAISER

ISTINGER, M., and KAISER, Hans K.

1. A characterization of polynomially complete algebras. J. Algebra 56 (1979), no. 1, 103--110. MR 80e:08004 X

JACOB, V. W.

See ASHRAF-JACOB-QUADRI

JACOBSON, Richard A.

1. The structure of near-rings on a group of prime order. Amer. Math. Monthly 73 (1966), 59--61. MR 34:213 A

JAGANNATHAN, T. V. S.

See JAGANNATHAN-SRINIVASAN

JAGANNATHAN, T. V. S., and SRINIVASAN, P.

1. André system and André near field. Combinatorics and applications (Calcutta, 1982), 176--191, Indian Statist. Inst., Calcutta, 1984. MR 87i:51011
2. Near-field-like planes. Finite geometries (Winnipeg, Man., 1984), 137--147, Lecture Notes in Pure and Appl. Math., 103, Dekker, New York, 1985. MR 87f:51005

JAT, J. L.

See CHOUDHARY-JAT

JAYARAM, C.

See JAYARAM-RAJKUMAR

JAYARAM, C., and RAJKUMAR, L. Johnson

1. Strongly regular nearrings I and II. J. Indian Math. Soc. (N. S.) 55 (1990), no. 1-4, 151--160, 161--173. MR 92f:16057 R'

JHA, Vikram

1. On the derivability of field transitive quasifields. J. London Math. Soc. (2) 23 (1981), no. 1, 41--44. MR 82k:51003

JIA, Zhi Zhong

1. Brown-McCoy radicals and semisimplicity of distributively generated nearrings. Acta Sci. Natur. Univ. Jilin. 1989, no. 4, 27--32. MR 91e:16055 D, R, S

JIANG, Zhong Lue

See JIANG-YOU-ZHENG

JIANG, Zhong Lue , YOU, Song Fa, and ZHENG, Yu Mei

1. A structure theorem for addition commutative cancellable semirings and its application. (Chinese). Adv. in Math. (China) 22 (1993), no. 4, 358--361.

JOHN, David

1. Residual finiteness and free d. g. near-rings. J. Austral. Math. Soc. A, 28 (1979), 398--400. MR 81b:16027 D, F'
2. Identities and left cancellation in d. g. near-rings. J. Austral. Math. Soc. (A) 30 (1980), 238--242. MR 82h:16028 E, D

See also JOHN-NEFF

JOHN, David, and NEFF, Mary F.

1. The word problem is solvable in $N_0$. Notices Amer Math. Soc. 26, A-45. F', X

JOHNSEN, E. C.

See JOHNSEN-STORER

JOHNSEN, E. C., and STORER, T.

1. Combinatorial structures in loops. III. Difference sets in special cyclic neofields. J. Number Theory 8 (1976), no. 1, 109--130.
2. Combinatorial structures in loops. II. Commutative inverse property cyclic neofields of prime-power order. Pacific J. Math. 52 (1974), 115--127.

JOHNSON, H. H.

1. Realization of abstract algebras of functions. Math. Ann. 142 (1961), 317--321. Cr, E

JOHNSON, J. J.

See HAUSEN-JOHNSON

JOHNSON, Majory J.

1. Ideal and submodule structure of transformation near-rings. Doctoral Diss., University of Iowa, 1970. T, E'', R, S, D
2. Radicals of endomorphism near-rings. Rocky Mountain J. Math. 3 (1973), 1--7. MR 48:4056 E'', R, N
3. Right ideals and right submodules of transformation near-rings. J. Algebra 24 (1973), 386--391. MR 47:3459 E, T
4. Near-rings with identities on dihedral groups. Proc. Edinb. Math. Soc. (2) 18 (1973), 219--228. MR 47:5058 A
5. Chain conditions on regular near-rings. Univ. of South Carolina, Math. Technical Reports No. 16A76-2, 1974. R', E, T
6. Maximal right ideals of transformation near-rings. J. Austral. Math. Soc. 19 (1975), 410--412. MR 51:8183 T
7. Radicals of regular near-rings. Monatsh. Math. 80 (1975), 331--341. MR 53:5675 R, R', P, S, T, F

JOHNSON, Norman L.

1. Homology groups, nearfields and reguli. J. Geom. 42 (1991), 109--125. MR 92k:51013
2. Half nearfield planes. Osaka J. Math. 31 (1994), no. 1, 61--78. MR 95i:51017
3. Flocks of infinite hyperbolic quadrics. J. Algebraic Combin. 6 (1997), no. 1, 27--51. MR 97k:51001

See also HIRAMINE-JOHNSON, JOHNSON-POMAREDA

JOHNSON, N. L., and POMAREDA, Rolando

1. Andr\'{e} planes and nests of reguli. Geom. Dedicata 31 (1989), no. 3, 245--260. MR 90k:51014

JONES, Patricia

1. Distributive near-rings. Thesis, Univ. of Southw. Louisiana, 1976. _D, A, X
2. Zero square near-rings. J. Austral. Math. Soc. (ser. A) 51 (1991), 497--504. MR 92i:16034 D, D', N, A, B, _D, E

See also JONES-LIGH

JONES, Patricia, and LIGH, Steve

1. Finite hereditary near-ring semigroups. Pacific J. Math. 86 (1980), 491--504. MR 81k:16035 M', I', F

JORDAN, Elfriede

1. Fastalgebren. Thesis, Univ. Linz, 1976. Na, E, E', D', F', S, R, T'

JORDAN, Pascual (1902-1980)

1. \"{U}ber polynomiale Fastringe. Akad. Wiss. Mainz, Math. -Nat. Kl. (1951), 337--340. MR 13:7 Po, E

JUN, Young Bae

See JUN-KIM, JUN-KIM-YON, JUN-KWON-PARK, JUN-\"{O}ZT\"{U}RK-SAPANCI

JUN, Young Bae, and KIM, Kyung Ho

1. On fuzzy $R$-subgroups of near-rings. J. Fuzzy Math. 8 (2000), no. 3, 549--558.

JUN, Young Bae, KIM, KYUNG Ho, and YON, Yong Ho

1. Intuitionistic fuzzy ideals of near-rings. J. Inst. Math. Comput. Sci. Math. Ser. 12 (1999), no. 3, 221--228.

JUN, Young Bae, KWON, Young In, and PARK, June Won

1. Fuzzy $M\Gamma $-groups. Kyungpook Math. J. 35 (1995), no. 2, 259--265. MR 97d:16051

JUN, Young Bae, \"{O}ZT\"{U}RK, M. A., and SAPANCI, M.

1. Fuzzy ideals in gamma near-rings. Turkish J. Math. 22 (1998), no. 4, 449--459. MR 2000h:16059

KAARLI, Kalle

1. A note on near-rings with identity. (Russian; English and Estonian summaries), Tartu Riikl. \"{U}l. Toimetised 336 (1974), 234--242. MR 52:3247 A
2. Minimal ideals in near-rings. (Russian; English and Estonian summaries), Tartu Riikl. \"{U}l. Toimetised 336 (1975), 105--142. MR 56:424 E, P, S, T, N
3. Special D-radicals of near-rings. (Russian). Vsesojusnij simpos. p. teoriy kolez, moduliy i algebr. Math. Inst. Univ. Tartu (USSR), 1976. R, D
4. Radicals of near-rings. (Russian; English and Estonian summaries), Tartu Riikl. \"{U}l. Toimetised 390 (1976), 134--171. MR 57:9760 R, M, N, P, P', Q, Q', S
5. On near-rings generated by the endomorphisms of some groups. (Russian; Estonian and English summaries), Tartu Riikl. \"{U}l. Toimetised 464, Trudy Mat. i. Mech. No. 22 (1978), 3--12. MR 80a:16049 E'', P, Po
6. Almost artinian near-rings. (Russian). Diss. Tartu State Univ., 1979. A, D, E, M, N, P, P', Q, Q', R, S, X
7. The classification of irreducible R-groups over a semiprimary near-ring. (Russian; English and Estonian summaries), Tartu Riikl. \"{U}l. Toimetised 556 (1981), 47--63. MR 82k:16047 P, N
8. A new characterization of semiprimary near-rings. Proc. Conf. San Benedetto del Tronto, 1981, 83--94. P, P', R, N, X
9. Special radicals of near-rings. (Russian). Tartu Riikl. \"{U}l. Toimetised 610 (1982), 53--68. MR 85c:16053 P, R
10. On radicals of finite near-rings. Proc. Edinb. Math. Soc. 27 (1984), 247--259. MR 86m:16010 R, S, Ua
11. On Jacobson-type radicals of near-rings. Acta Math. Hungar. 50 (1987), 71--78. MR 88d:16023 P, R, S, Q, N
12. Survey on the radical theory of near-rings. Contr. to Gen. Alg. 4, Teubner, Stuttgart 1987, 45--62. MR 89c:16050 R, S, Ua, P, N
13. On minimal ideals of distributively generated near-rings. Contrib. General Algebra 7 (1991), 201--204. MR 92i:16035 D, E, S, P
14. On ideal transitivity in near-rings. in: Contrib. Gen. Alg. 8 (ed.: G. Pilz), H\"{o}lder-Pichler-Tempsky, Vienna and Teubner, Stuttgart, 1992, 81--89.
15. Primitivity and simplicity of non-zerosymmetric near-rings. Comm. Algebra 26 (1998), 3691--3708.
16. On non-zerosymmetric near-rings with minimum condition. ``Nearrings, Nearfields and K-Loops" (Hamburg, 1995), pp. 21--34. Kluwer Acad. Publ. Dordrecht, the Netherlands, (1997).
17. On radical theory of non-zerosymmetric near-rings. International Conference on the Theory of Radicals and Rings (Port Elizabeth, 1997). Quaest. Math. 22 (1999), no. 3, 405--425.

See also ANDERSON-KAARLI-WIEGANDT, BETSCH-KAARLI, FONG-KAARLI, FONG-KAARLI-KE, FUCHS-MAXSON-VAN DER WALT-KAARLI, KAARLI-KRIIS

KAARLI, Kalle, and KRIIS, T.

1. Prime radical of near-rings. Tartu Riikl. \"{U}l. Toimetised 764 (1987), 23--29. MR 88j:16047 P', R, N

KABZA, Lucyna

1. The simplicity of some zero-symmetric and nonzero-symmetric near-rings. Doctoral Dissertation, Texas A\&M Univ., College Station, USA, 1993. S, T, I
2. Simplicity of some nonzero-symmetric centralizer near-rings. ``Near-rings and Near-fields," (Fredericton, NB, 1993), pp. 145--152. Math. Appl., 336, Kluwer Acad. Publ. Dordrecht, the Netherlands, (1995).
3. The centralizer near-ring of an inverse semigroup of endomorphisms of a group. Comm. Algebra 23 (1995), 5419--5435. MR 96m:16065

See also CANNON-KABZA, FUCHS-KABZA

KAISER, Hans K.

1. Interpolation in near-rings. Conf. Edinburgh, 1978. Po, Ua, X