Invertibility threshold for H∞ trace algebras, and effective matrix inversions

Abstract

For a given δ, 0<δ<1, a Blaschke sequence σ=\λj\ is constructed such that every function f, f∈ H∞, having δ<δf=∈fλ∈σ|f(λ)|\|f\|∞1 is invertible in the trace algebra H∞|σ (with a norm estimate of the inverse depending on δf only), but there exists f with δ=δf\|f\|∞1, which does not. As an application, a counterexample to a stronger form of the Bourgain--Tzafriri restricted invertibility conjecture for bounded operators is exhibited, where an ``orthogonal (or unconditional) basis'' is replaced by a ``summation block orthogonal basis''.