Generalizing Lieb's Concavity Theorem via Operator Interpolation

Abstract

We introduce the notion of k-trace and use interpolation of operators to prove the joint concavity of the function (A,B)k[(Bqs2K*ApsKBqs2)1s]1k, which generalizes Lieb's concavity theorem from trace to a class of homogeneous functions Trk[·]1k. Here Trk[A] denotes the kth elementary symmetric polynomial of the eigenvalues of A. This result gives an alternative proof for the concavity of Ak[(H+ A)]1k that was obtained and used in a recent work to derive expectation estimates and tail bounds on partial spectral sums of random matrices.