Preservers of λ-Aluthge transforms

Abstract

Let M and N be arbitrary von Neumann algebras. For any a in M or in N, let λ(a) denote the λ-Aluthge transform of a. Suppose that M has no abelian direct summand. We prove that every bijective map :M N satisfying (λ(a b*))=λ((a) (b)*), for all a,\;b∈ M, (for a fixed λ∈ [0,1]), maps the hermitian part of M onto the hermitian part of N (i.e. (Msa) = Nsa) and its restriction |Msa : Msa Nsa is a Jordan isomorphism. If we also assume that (x +i y ) = (x) + (i y) for all x,y∈ Msa, then there exists a central projection pc in M such that |pc M is a complex linear Jordan *-isomorphism and |(1-pc) M is a conjugate linear Jordan *-isomorphism. Given two complex Hilbert spaces H and K with dim(H)≥ 2, we also establish that every bijection : B(H) B(K) satisfying (λ(a b*))=λ((a) (b)*), for all a,\;b∈ B(H), must be a complex linear or a conjugate linear *-isomorphism.