Notes on generalized $({\sigma } ,{\tau } )$–derivation

Gölbaşi, Öznur; Koç, Emine

Notes on generalized

(σ, τ)

–derivation

Gölbaşi, Öznur ; Koç, Emine

Rendiconti del Seminario Matematico della Università di Padova, Tome 124 (2010), p. 131-140 / Harvested from Numdam

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Publié le : 2010-01-01

MR 2683294 | Zbl 1202.16036

@article{RSMUP_2010__123__131_0,
     author = {G\"olba\c si, \"Oznur and Ko\c c, Emine},
     title = {Notes on generalized $({\sigma } ,{\tau } )$--derivation},
     journal = {Rendiconti del Seminario Matematico della Universit\`a di Padova},
     volume = {124},
     year = {2010},
     pages = {131-140},
     mrnumber = {2683294},
     zbl = {1202.16036},
     language = {en},
     url = {http://dml.mathdoc.fr/item/RSMUP_2010__123__131_0}
}

Gölbaşi, Öznur; Koç, Emine. Notes on generalized $({\sigma } ,{\tau } )$–derivation. Rendiconti del Seminario Matematico della Università di Padova, Tome 124 (2010) pp. 131-140. http://gdmltest.u-ga.fr/item/RSMUP_2010__123__131_0/

Bibliographie

[1] N. Argaç - E. Albaş, Generalized derivations of prime rings, Algebra Coll., 11 (3) (2004), pp. 399--410. | MR 2081197 | Zbl 1074.16022

[2] M. Ashraf - N. Rehman - M. A. Quadri, On $(σ, τ)$ -derivations in certain clases of rings, Radovi Math., 9 (2) (1999), pp. 187--192. | MR 1790206 | Zbl 0963.16031

[3] A. Asma - N. Rehman - A. Shakir, On Lie ideals with derivations as homomorphisms and anti-homomorphisms, Acta Mathematica Hungarica, 101 (2003), pp. 79--82. | MR 2011464 | Zbl 1053.16025

[4] A. Asma - D. Kumar, Derivation which acts as a homomorphism or as an anti-homomorphism in prime ring, International Math. Forum, 2 (23) (2007), pp. 1105--1110. | MR 2334023 | Zbl 1146.16015

[5] H. E. Bell - W. S. Martindale, Centralizing mappings of semiprime rings, Canad. Math. Bull., 30 (1) (1987), pp. 92--101. | MR 879877 | Zbl 0614.16026

[6] H. E. Bell - L. C. Kappe, Rings in which derivations satisfy certain algebraic conditions, Acta math. Hungarica, 53 (1989), pp. 339--346. | MR 1014917 | Zbl 0705.16021

[7] Ö. Gölbaşi - N. Aydin, Some results on endomorphisms of prime ring which are $(σ, τ)$ -derivation, East Asian Math. J., 18 (2) (2002), pp. 195--203. | Zbl 1030.16020

[8] B. Hvala, Generalized derivations in rings, Comm. Algebra, 26 (4) (1998), pp. 1147--1166. | MR 1612208 | Zbl 0899.16018

[9] H. Kandamar - K. Kaya, Lie ideals and $(σ, τ)$ -derivation in prime rings, Hacettepe Bull. Natural Sci. and Engeneering, 21 (1992), pp. 29--33. | Zbl 0791.16027

[10] N. Rehman, On commutativity of rings with generalized derivations, Math. J. Okayama Univ., 44 (2002), pp. 43--49. | MR 1961123 | Zbl 1030.16022

[11] N. Rehman, On generalized derivations as homomorphisms and anti-homomorphisms, Glasnik Mathematicki, 39 (59) (2004), pp. 27--30. | MR 2055383 | Zbl 1047.16019

[12] E. C. Posner, Derivations in prime rings, Proc. Amer. Math. Soc., 8 (1957), pp. 1093--1100. | MR 95863 | Zbl 0082.03003