English

Functions preserving operator means

Functional Analysis 2019-12-24 v1

Abstract

Let σ\sigma be a non-trivial operator mean in the sense of Kubo and Ando, and let OM+1OM_+^1 the set of normalized positive operator monotone functions on (0,)(0, \infty). In this paper, we study class of σ\sigma-subpreserving functions fOM+1f\in OM_+^1 satisfying f(AσB)f(A)σf(B)f(A\sigma B) \le f(A)\sigma f(B) for all positive operators AA and BB. We provide some criteria for ff to be trivial, i.e., f(t)=1f(t)=1 or f(t)=tf(t)=t. We also establish characterizations of σ\sigma-preserving functions ff satisfying f(AσB)=f(A)σf(B)f(A\sigma B) = f(A)\sigma f(B) for all positive operators AA and BB. In particular, when limt0(1σt)=0\lim_{t\rightarrow 0} (1\sigma t) =0, the function ff preserves σ\sigma if and only if ff and 1σt1\sigma t are representing functions for weighted harmonic means.

Cite

@article{arxiv.1912.10378,
  title  = {Functions preserving operator means},
  author = {Trung Hoa Dinh and Hiroyuki Osaka and Shuhei Wada},
  journal= {arXiv preprint arXiv:1912.10378},
  year   = {2019}
}
R2 v1 2026-06-23T12:53:37.712Z