Affiliation:
1. Department of Mathematics, Aligarh Muslim University, Aligarh 202002, India
Abstract
Let R be a ring. We say that a family of maps D={dn}n∈N is a Jordan higher derivable map (without assumption of additivity) on R if d0=IR (the identity map on R) and dn(ab+ba)=∑p+q=ndp(a)dq(b)+∑p+q=ndp(b)dq(a) hold for all a,b∈R and for each n∈N. In this paper, we show that every Jordan higher derivable map on a ring under certain assumptions becomes a higher derivation. As its application, we get that every Jordan higher derivable map on Banach algebra is an additive higher derivation.
Cited by
4 articles.
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2. Lie triple higher derivable maps on rings;Communications in Algebra;2016-10-07
3. On Jordan Triple Higher Derivable Mappings on Rings;Mediterranean Journal of Mathematics;2015-07-17
4. On Lie higher derivable mappings on prime rings;Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry;2015-04-05