Characterizations of Jordan mappings on some rings and algebras through zero products
Abstract
Let U=[ arraycc A & M N& B array ] be a generalized matrix ring, where A and B are 2-torsion free. We prove that if φ :U→ U is an additive mapping such that φ(U) V+U φ(V)=0 whenever UV=VU=0, then φ=δ+η, where δ is a Jordan derivation and η is a multiplier. As its applications, we prove that the similar conclusion remains valid on full matrix algebras, unital prime rings with a nontrivial idempotent, unital standard operator algebras, CDCSL algebras and von Neumann algebras.
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