English

Generalizing Lieb's Concavity Theorem via Operator Interpolation

Functional Analysis 2020-05-19 v2 Operator Algebras

Abstract

We introduce the notion of kk-trace and use interpolation of operators to prove the joint concavity of the function (A,B)Trk[(Bqs2KApsKBqs2)1s]1k(A,B)\mapsto\text{Tr}_k\big[(B^\frac{qs}{2}K^*A^{ps}KB^\frac{qs}{2})^{\frac{1}{s}}\big]^\frac{1}{k}, which generalizes Lieb's concavity theorem from trace to a class of homogeneous functions Trk[]1k\text{Tr}_k[\cdot]^\frac{1}{k}. Here Trk[A]\text{Tr}_k[A] denotes the kthk_{\text{th}} elementary symmetric polynomial of the eigenvalues of AA. This result gives an alternative proof for the concavity of ATrk[exp(H+logA)]1kA\mapsto\text{Tr}_k\big[\exp(H+\log A)\big]^\frac{1}{k} that was obtained and used in a recent work to derive expectation estimates and tail bounds on partial spectral sums of random matrices.

Keywords

Cite

@article{arxiv.1904.03304,
  title  = {Generalizing Lieb's Concavity Theorem via Operator Interpolation},
  author = {De Huang},
  journal= {arXiv preprint arXiv:1904.03304},
  year   = {2020}
}
R2 v1 2026-06-23T08:31:07.401Z