Sharp nonzero lower bounds for the Schur product theorem

Abstract

By a result of Schur [J. Reine Angew. Math. 1911], the entrywise product M N of two positive semidefinite matrices M,N is again positive. Vybiral [Adv. Math. 2020] improved on this by showing the uniform lower bound M M ≥ En / n for all n × n real or complex correlation matrices M, where En is the all-ones matrix. This was applied to settle a conjecture of Novak [J. Complexity 1999] and to positive definite functions on groups. Vybiral (in his original preprint) asked if one can obtain similar uniform lower bounds for higher entrywise powers of M, or for M N when N ≠ M, M. A natural third question is to obtain a tighter lower bound that need not vanish as n ∞, i.e. over infinite-dimensional Hilbert spaces. In this note, we affirmatively answer all three questions by extending and refining Vybiral's result to lower-bound M N, for arbitrary complex positive semidefinite matrices M, N. Specifically: we provide tight lower bounds, improving on Vybiral's bounds. Second, our proof is 'conceptual' (and self-contained), providing a natural interpretation of these improved bounds via tracial Cauchy-Schwarz inequalities. Third, we extend our tight lower bounds to Hilbert-Schmidt operators. As an application, we settle Open Problem 1 of Hinrichs-Krieg-Novak-Vybiral [J. Complexity, in press], which yields improvements in the error bounds in certain tensor product (integration) problems.