A proof of Esterle's conjecture on negative powers of Hilbert-space contractions

Abstract

We establish the following result, confirming a conjecture of Jean Esterle. For each closed subset E of the unit circle of Lebesgue measure zero, there exists a positive sequence un∞ with the following property: if T is a contraction on a Hilbert space such that σ(T)⊂ E and \|T-n\|=O(un) as n∞, then T is a unitary operator. A key tool used in the proof is a result generalizing the well-known fact that closed subsets E of the real axis of Lebesgue measure zero are removable for bounded holomorphic functions. We show that such sets remain removable even for certain unbounded holomorphic functions of moderate growth near E, where the notion of `moderate' depends on E.