Preservers of the p-power and the Wasserstein means on 2 × 2 matrices

Abstract

In one of his recent papers ML1, Moln\'ar showed that if A is a von Neumann algebra without I1, I2-type direct summands, then any function from the positive definite cone of A to the positive real numbers preserving the Kubo-Ando power mean for some 0 ≠ p ∈ (-1,1) is necessarily constant. It was shown in that paper, that I1-type algebras admit nontrivial p-power mean preserving functionals, and it was conjectured, that I2-type algebras admit only constant p-power mean preserving functionals. We confirm the latter. A similar result occurred in another recent paper of Moln\'ar ML2 concerning the Wasserstein mean. We prove the conjecture for I2-type algebras in regard of the Wasserstein mean, too. We also give two conditions that characterise centrality in C*-algebras.