Lie-Type Derivations of Nest Algebras on Banach Spaces

Abstract

Let X be a Banach space over the complex field C and B(X) be the algebra of all bounded linear operators on X. Let N be a non-trivial nest on X, AlgN be the nest algebra associated with N, and L AlgN B(X) be a linear mapping. Suppose that pn(x1,x2,·s,xn) is an (n-1)-th commutator defined by n indeterminates x1, x2, ·s, xn. It is shown that L satisfies the rule L(pn(A1, A2, ·s, An))=Σk=1npn(A1, ·s, Ak-1, L(Ak), Ak+1, ·s, An) for all A1, A2, ·s, An∈ AlgN if and only if there exist a linear derivation D AlgN B(X) and a linear mapping H AlgN CI vanishing on each (n-1)-th commutator pn(A1,A2,·s, An) for all A1, A2, ·s, An∈ AlgN such that L(A)=D(A)+H(A) for all A∈ AlgN.