Turkmen, SelinAydin, Neset2025-01-272025-01-2720151303-5010https://search.trdizin.gov.tr/tr/yayin/detay/483004https://hdl.handle.net/20.500.12428/28983Let R be a sigma-prime ring with characteristic not 2, Z (R) be the center of R, I be a nonzero sigma-ideal of R, alpha, beta : R -> R be two automorphisms, d be a nonzero (alpha, beta)-derivation of R and h be a nonzero derivation of R : In the present paper, it is shown that (i) If d (I) subset of C-alpha,C-beta and beta commutes with sigma then R is commutative. (ii) Let alpha and beta commute with sigma. If a is an element of I boolean AND S-sigma (R) and [d(I), a](alpha,beta) subset of C-alpha,C-beta then a is an element of Z(R). (iii) Let alpha, beta and h commute with sigma. If dh (I) subset of C-alpha,C- beta and h(I) subset of I then R is commutative.eninfo:eu-repo/semantics/closedAccesssigma-prime ringsigma-ideal(alpha, beta)-derivationArticle44511471156Q4WOS:0003685020000142-s2.0-84961637929483004Q2