Characterizations of (Jordan) derivation on Banach algebra with local actions

Abstract

Let A be a unital Banach *-algebra and M be a unital *-A-bimodule. If W is a left separating point of M, we show that every *-derivable mapping at W is a Jordan derivation, and every *-left derivable mapping at W is a Jordan left derivation under the condition W A=AW. Moreover we give a complete description of linear mappings δ and τ from A into M satisfying δ(A)B*+Aτ(B)*=0 for any A, B∈ A with AB*=0 or δ(A) B*+Aτ(B)*=0 for any A, B∈ A with A B*=0, where A B=AB+BA is the Jordan product.

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