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http://dx.doi.org/10.4134/BKMS.2014.51.4.1127

NONADDITIVE STRONG COMMUTATIVITY PRESERVING DERIVATIONS AND ENDOMORPHISMS

Zhang, Wei (College of Mathematics Jilin University)
Xu, Xiaowei (College of Mathematics Jilin University)

Publication Information

Bulletin of the Korean Mathematical Society / v.51, no.4, 2014 , pp. 1127-1133 More about this Journal

Abstract

Let S be a nonempty subset of a ring R. A map $f:R{\rightarrow}R$ is called strong commutativity preserving on S if [f(x), f(y)] = [x, y] for all $x,y{\in}S$ , where the symbol [x, y] denotes xy - yx. Bell and Daif proved that if a derivation D of a semiprime ring R is strong commutativity preserving on a nonzero right ideal ${\rho}$ of R, then ${\rho}{\subseteq}Z$ , the center of R. Also they proved that if an endomorphism T of a semiprime ring R is strong commutativity preserving on a nonzero two-sided ideal I of R and not identity on the ideal $I{\cup}T^{-1}(I)$ , then R contains a nonzero central ideal. This short note shows that the conclusions of Bell and Daif are also true without the additivity of the derivation D and the endomorphism T.

Keywords

semiprime ring; prime ring; strong commutativity preserving map;

Citations & Related Records

Reference

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