On a class of determinant preserving maps for finite von Neumann algebras

Abstract

Let R be a finite von Neumann algebra with a faithful tracial state τ and let denote the associated Fuglede-Kadison determinant. In this paper, we characterize all unital bijective maps φ on the set of invertible positive elements in R which satisfy (φ(A)+φ(B)) = (A+B). We show that any such map originates from a τ-preserving Jordan *-automorphism of R (either *-automorphism or *-anti-automorphism in the more restrictive case of finite factors). In establishing the aforementioned result, we make crucial use of the solutions to the equation (A + B) = (A) + (B) in the set of invertible positive operators in R. To this end, we give a new proof of the inequality (A+B) (A) + (B), using a generalized version of the Hadamard determinant inequality and conclude that equality holds for invertible B if and only if A is a nonnegative scalar multiple of B.