Chinese Quarterly Journal of Mathematics ›› 2023, Vol. 38 ›› Issue (2): 134-144.doi: 10.13371/j.cnki.chin.q.j.m.2023.02.003

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Differential Identities in Prime Rings with Involution

  

  1. School of Mathematics and Finance, Chuzhou University,
  • Received:2022-04-18 Online:2023-06-30 Published:2023-06-30
  • Contact: HUANG Shu-liang (1981-), male, native of Weifang, Shandong, professor of Chuzhou University, engages in rings and algebras. E-mail: shulianghuang@sina.com
  • About author:HUANG Shu-liang (1981-), male, native of Weifang, Shandong, professor of Chuzhou University, engages in rings and algebras.
  • Supported by:
     Supported by the University Science Research Project of Anhui Province (Grant Nos. KJ2020A0711, KJ2020ZD74, KJ2021A1096) and the Natural Science Foundation of Anhui Province (Grant No. 1908085MA03).

Abstract: Let R be a prime ring of characteristic different from two with the sec- ond involution ∗ and α an automorphism of R . An additive mapping F of R is called a generalized ( α,α )-derivation on R if there exists an ( α,α )-derivation d of R such that F ( xy )= F ( x ) α ( y )+ α ( x ) d ( y ) holds for all x,y∈R. The paper deals with the s- tudy of some commutativity criteria for prime rings with involution. Precisely, we describe the structure of R admitting a generalized ( α,α )-derivation F satisfying any one of the following properties:
( i ) F ( xx) −α ( xx) ∈Z ( R ).
( ii ) F ( xx )+ α ( xx ) ∈Z ( R ).
( iii ) F ( x ) F ( xx) −α ( xx) ∈Z ( R ).
( iv ) F ( x ) F (x)+ α ( xx) ∈Z ( R ).
( v ) F ( xx) −F ( x ) F (x ) ∈Z ( R ).
( vi ) F ( xx) −F (x) F ( x )=0
for all x∈R . Also, some examples are given to demonstrate that the restriction of the various results is not superfluous. In fact, our results unify and extend several well known theorems in literature.

Key words: Prime rings, Generalized (α,α)-derivations, Involution, Commutativity

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