English

Characterizing Schwarz maps by tracial inequalities

Mathematical Physics 2023-02-15 v4 Functional Analysis math.MP

Abstract

Let ϕ\phi be a linear map from the n×nn\times n matrices Mn{\mathcal M}_n to the m×mm\times m matrices Mm{\mathcal M}_m. It is known that ϕ\phi is 22-positive if and only if for all KMnK\in {\mathcal M}_n and all strictly positive XMnX\in {\mathcal M}_n, ϕ(KX1K)ϕ(K)ϕ(X)1ϕ(K)\phi(K^*X^{-1}K) \geq \phi(K)^*\phi(X)^{-1}\phi(K). This inequality is not generally true if ϕ\phi is merely a Schwarz map. We show that the corresponding tracial inequality Tr[ϕ(KX1K)]Tr[ϕ(K)ϕ(X)1ϕ(K)]{\rm Tr}[\phi(K^*X^{-1}K)] \geq {\rm Tr}[\phi(K)^*\phi(X)^{-1}\phi(K)] holds for a wider class of positive maps that is specified here. We also comment on the connections of this inequality with various monotonicity that have found wide use in mathematical physics, and apply it, and a close relative, to obtain some new, definitive results.

Cite

@article{arxiv.2203.03433,
  title  = {Characterizing Schwarz maps by tracial inequalities},
  author = {Eric A. Carlen and Alexander Müller-Hermes},
  journal= {arXiv preprint arXiv:2203.03433},
  year   = {2023}
}

Comments

v4 corrects a number of small typos and includes some additional results and discussion

R2 v1 2026-06-24T10:04:39.874Z