Mappings on some reflexive algebras characterized by action on zero products or Jordan zero products

Abstract

Let L be a subspace lattice on a Banach space X and let δ:AlgL→ B(X) be a linear mapping. If \L∈ L: L- L\=X or \L-:L∈ L, L- L\=(0), we show that the following three conditions are equivalent: (1) δ(AB)=δ(A)B+Aδ(B) whenever AB=0; (2) δ(AB+BA)=δ(A)B+Aδ(B)+δ(B)A+Bδ(A) whenever AB+BA=0; (3) δ is a generalized derivation and δ(I)∈ (AlgL). If \L∈ L: L- L\=X or \L-:L∈ L, L- L\=(0) and δ satisfies δ(AB+BA)=δ(A)B+Aδ(B)+δ(B)A+Bδ(A) whenever AB=0, we obtain that δ is a generalized derivation and δ(I)A∈(AlgL) for every A∈ AlgL. We also prove that if \L∈ L: L- L\=X and \L-:L∈ L, L- L\=(0), then δ is a local generalized derivation if and only if δ is a generalized derivation.