English

Trace arithmetic--$\kappa_p$ inequality

Operator Algebras 2026-02-13 v1 Functional Analysis

Abstract

Let A\mathcal{A} be a unital CC^\ast-algebra equipped with a faithful tracial positive linear functional τ\tau. Denote by A+\mathcal{A}_+ its positive cone. For p>0p>0 and A,BA+A,B\in\mathcal{A}_+, we consider the operations AκpB:=(Ap/4Bp/2Ap/4)1/p,AB:=A+B2. A\kappa_p B := \bigl(A^{p/4} B^{p/2} A^{p/4}\bigr)^{1/p}, \qquad A\nabla B := \frac{A+B}{2}. We prove that, for all p>0p>0 and all A,BA+A,B\in\mathcal{A}_+, τ(AκpB)τ(A)τ(B)τ(AB), \tau(A\kappa_p B)\le \sqrt{\tau(A)\tau(B)}\le \tau(A\nabla B), thereby answering \cite[Problem~1]{KM24}, posed by \'A.~Kom\'alovics and L.~Moln\'ar, in the affirmative. We also record a unitarily invariant norm analogue of the key estimate in the matrix case, and we provide explicit 2×22\times2 counterexamples showing that the triangle inequality for dpd_p may fail when 0<p<10<p<1 (already for p=12p=\tfrac12), giving a partial answer to \cite[Problem~2]{KM24}.

Keywords

Cite

@article{arxiv.2602.11922,
  title  = {Trace arithmetic--$\kappa_p$ inequality},
  author = {Teng Zhang},
  journal= {arXiv preprint arXiv:2602.11922},
  year   = {2026}
}

Comments

7 pages. All comments are welcome!

R2 v1 2026-07-01T10:33:37.553Z