Projecting onto Helson matrices in Schatten classes

Abstract

A Helson matrix is an infinite matrix A = (am,n)m,n≥1 such that the entry am,n depends only on the product mn. We demonstrate that the orthogonal projection from the Hilbert--Schmidt class S2 onto the subspace of Hilbert--Schmidt Helson matrices does not extend to a bounded operator on the Schatten class Sq for 1 ≤ q ≠ 2 < ∞. In fact, we prove a more general result showing that a large class of natural projections onto Helson matrices are unbounded in the Sq-norm for 1 ≤ q ≠ 2 < ∞. Two additional results are also presented.