Transformations preserving the norm of means between positive cones of general and commutative C*-algebras

Abstract

In this paper, we consider a (nonlinear) transformation of invertible positive elements in C*-algebras which preserves the norm of any of the three fundamental means of positive elements; namely, \|(A) (B)\| = \|A B\|, where stands for the arithmetic mean A∇ B=(A+B)/2, the geometric mean A\#B=A1/2(A-1/2BA-1/2)1/2A1/2, or the harmonic mean A!B=2(A-1 + B-1)-1. Assuming that is surjective and preserves either the norm of the arithmetic mean or the norm of the geometric mean, we show that extends to a Jordan *-isomorphism between the underlying full algebras. If is surjective and preserves the norm of the harmonic mean, then we obtain the same conclusion in the special cases where the underlying algebras are AW*-algebras or commutative C*-algebras. In the commutative case, for a transformation T: F(X)⊂ C0(X)+→ C0(Y)+, we can relax the surjectivity assumption and show that T is a generalized composition operator if T preserves the norm of the (arithmetic, geometric, harmonic, or in general any power) mean of any finite collection of positive functions, provided that the domain F(X) contains sufficiently many elements to peak on compact Gδ sets. When the image T(F(X)) also contains sufficiently many elements to peak on compact Gδ sets, T extends to an algebra *-isomorphism between the underlying full function algebras.