Lie ring isomorphisms between nest algebras on Banach spaces

Abstract

Let N and M be nests on Banach spaces X and Y over the (real or complex) field F and let Alg N and Alg M be the associated nest algebras, respectively. It is shown that a map : Alg N→ Alg M is a Lie ring isomorphism (i.e., is additive, Lie multiplicative and bijective) if and only if has the form (A) = TAT-1 + h(A)I for all A∈ Alg N or (A)=-TA*T-1+h(A)I for all A∈ Alg N, where h is an additive functional vanishing on all commutators and T is an invertible bounded linear or conjugate linear operator when X=∞; T is a bijective τ-linear transformation for some field automorphism τ of F when X<∞.