An arithmetic-geometric mean inequality for products of three matrices

Abstract

Consider the following noncommutative arithmetic-geometric mean inequality: given positive-semidefinite matrices A1, …, An, the following holds for each integer m ≤ n: 1nmΣj1, j2, …, jm = 1n ||| Aj1 Aj2 … Ajm ||| ≥ (n-m)!n! Σj1, j2, …, jm = 1 \\ all distinctn ||| Aj1 Aj2 … Ajm |||, where ||| · ||| denotes a unitarily invariant norm, including the operator norm and Schatten p-norms as special cases. While this inequality in full generality remains a conjecture, we prove that the inequality holds for products of up to three matrices, m ≤ 3. The proofs for m = 1,2 are straightforward; to derive the proof for m=3, we appeal to a variant of the classic Araki-Lieb-Thirring inequality for permutations of matrix products.