Bounded and compact Toeplitz+Hankel matrices

Abstract

We show that an infinite Toeplitz+Hankel matrix T() + H() generates a bounded (compact) operator on p(N0) with 1≤ p≤ ∞ if and only if both T() and H() are bounded (compact). We also give analogous characterizations for Toeplitz+Hankel operators acting on the reflexive Hardy spaces. In both cases, we provide an intrinsic characterization of bounded operators of Toeplitz+Hankel form similar to the Brown-Halmos theorem. In addition, we establish estimates for the norm and the essential norm of such operators.