Title of article
Characterization of jordan*-derivations by local action on rings with involution
Author/Authors
Zhao ، Xingxing Department of Mathematics - Shanxi University , Qi ، Xiaofei Department of Mathematics - Shanxi University
From page
120
To page
127
Abstract
Let R be a ring with an involution ∗ and a symmetric idempotent e. It is shown that, under some mild conditions on R, an additive map δ : R → R satisfies δ(ab + ba) = δ(a)b ∗ + aδ(b) + δ(b)a ∗ + bδ(a) whenever ab = e for a, b ∈ R if and only if δ is a Jordan *-derivation.
Keywords
Rings with involution , Jordan * , derivations , Derivations
Journal title
Journal of Hyperstructures
Journal title
Journal of Hyperstructures
Record number
2774448
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