Weak log majorization and determinantal inequalities

Abstract

Denote by n the set of n× n positive definite matrices. Let D = D1 … Dk, where D1∈ n1, …, Dk ∈ nk with n1+·s + nk=n. Partition C∈ n according to (n1, …, nk) so that C = C1 … Ck. We prove the following weak log majorization result: equation* λ (C-11D1 ·s C-1kDk)w \, λ(C-1D), equation* where λ(A) denotes the vector of eigenvalues of A∈ . The inequality does not hold if one replaces the vectors of eigenvalues by the vectors of singular values, i.e., equation* s(C-11D1 ·s C-1kDk)w \, s(C-1D) equation* is not true. As an application, we provide a generalization of a determinantal inequality of Matic [Theorem 1.1]M. In addition, we obtain a weak majorization result which is complementary to a determinantal inequality of Choi [Theorem 2]C and give a weak log majorization open question.