Strong Polarization and Entropy

Abstract

We show that for any set of n unit vectors v1,…,vn in a real Hilbert space and positive numbers p1,…,pn satisfying Σj pj = 1, there exists a unit vector u such that \[ Σj=1n pj2 vj, u2≤ 1. \] This inequality is a weighted version of the strong polarization inequality. As immediate corollaries, it yields a polarization inequality for products of powers of linear functionals and a strengthening of Bang's classical plank theorem for Hilbert spaces. The proof follows the approach introduced by Martínez and Ortega-Moreno in their recent solution to the strong polarization conjecture posed by Ball and Frenkel. We further note that our weighted inequality admits a Shannon-entropy interpretation: in a random sensing model, the entropy of the weights controls the minimum expected logarithmic loss.