Jordan product commuting maps with λ-Aluthge transform

Abstract

Let H and K be two complex Hilbert spaces and B(H) be the algebra of bounded linear operators from H into itself. The main purpose in this paper is to obtain a characterization of bijective maps : B(H) → B(K) satisfying the following condition λ ((A) (B)) = ( λ (A B)) for all A, B ∈ B(H), where λ (T) stands the λ-Aluthge transform of the operator T ∈ B(H) and A B = 1 2 (AB + BA) is the Jordan product of A and B. We prove that a bijective map satisfies the above condition, if and only if there exists an unitary operator U : H → K, such that has the form (A) = UAU * for all A ∈ B(H).