Prime ring,
semiprime rings,
Lie ideal,
Automorphism,
derivations,
Jordan derivations,
generalized derivations,
Functional identities.
UDC:
512.552
Subject:
Algebra, Ring Theory
Main publications:
Vincenzo De Filippis and Nadeem ur Rehman, “Commutativity and skew-commutativity conditions with generalized derivations”, Algebra Colloquium, 17:Spec 1 (2010), 841–850
Nadeem ur Rehman and Vincenzo De Filippis, “On $n$-commuting and $n$-skew-commuting maps with generalized derivations in semiprime rings”, Siberian Mathematical Journal, 52:3 (2011), 516–523
M. Ashraf, Nadeem ur Rehman, Shakir Ali and M. Rehman, “On generalized (,)-derivations in semiprime rings with involution”, Math. Slovaca, 62:3 (2012), 451–460
Nadeem ur Rehman, Abu Zaid Ansari, “On Lie ideals and generalized Jordan left derivations of prime rings”, Ukrainian Mathematical Journal, 65:8 (2013), 1118–1125
Nadeem ur Rehman, “On Lie ideals and generalized Jordan left derivations of prime rings”, Hacettepe Journal of Mathematics and Statistics, 42:6 (2013), 641–651
Nadeem ur Rehman, Hafedh Alnoghashi, “Identities related to homo-derivation on ideal in prime rings”, J. Sib. Fed. Univ. Math. Phys., 16:3 (2023), 370–384
2021
2.
M. A. Raza, N. Rehman, “A note on semiderivations in prime rings and $\mathscr{C}*$-algebras”, Vladikavkaz. Mat. Zh., 23:2 (2021), 70–77
2020
3.
N. Rehman, “On Lie Ideals and Automorphisms in Prime Rings”, Mat. Zametki, 107:1 (2020), 106–111; Math. Notes, 107:1 (2020), 140–144
N. Rehman, M. Arif Raza, “On $m$-commuting mappings with skew derivations in prime rings”, Algebra i Analiz, 27:4 (2015), 74–86; St. Petersburg Math. J., 27:4 (2016), 641–650
N. ur Rehman, V. De Filippis, “On $n$-commuting and $n$-skew-commuting maps with generalized derivations in prime and semiprime rings”, Sibirsk. Mat. Zh., 52:3 (2011), 655–664; Siberian Math. J., 52:3 (2011), 516–523
Contact us: