Every symmetric Kubo-Ando connection has the order-determining property on B(H)

Abstract

In molnar L.~Molnar studied the question of whether the L\"owner partial order on the positive cone of an operator algebra is determined by the norm of any arbitrary Kubo-Ando mean. He affirmatively answered the question for certain classes of Kubo-Ando means and left as an open problem the general case. We here give an answer to this question, by showing that the norm of every symmetric Kubo-Ando mean σ on B(H) is order-determining, i.e. if A, B∈ B(H)++ satisfy Aσ X Bσ X for every X∈ B(H)++, then A B.