Characterizations of Lie Higher Derivations on J-Subspace Lattice Algebras

Abstract

Let L be a J-subspace lattice on a Banach space X over the real or complex field F and AlgL be the associated J-subspace lattice algebras. In this paper, we characterize the structure of a family \Ln\n=0∞: AlgL→ AlgL of linear mappings satisfying the condition Ln([A, B])=Σi+j=n[Li(A), Lj(B)] for any A, B∈AlgL with AB = 0. Moreover, the family \Ln\n=0∞: AlgL→ AlgL of linear mappings satisfying Ln([A, B])=Σi+j=n[Li(A), Lj(B)] for any A, B∈AlgL with AB = 0 and 1≠ ∈ F is also considered in the current work.