Characterizations of centralizable mappings on algebras of locally measurable operators

Abstract

A linear mapping φ from an algebra A into its bimodule M is called a centralizable mapping at G∈A if φ(AB)=φ(A)B=Aφ(B) for each A and B in A with AB=G. In this paper, we prove that if M is a von Neumann algebra without direct summands of type I1 and type II, A is a *-subalgebra with M⊂eq A⊂eq LS(M) and G is a fixed element in A, then every continuous (with respect to the local measure topology t( M)) centralizable mapping at G from A into M is a centralizer.