On Shapiro's Compactness Criterion for Composition Operators

John Akeroyd

arXiv:1008.3131·math.CV·August 19, 2010·1 cites

On Shapiro's Compactness Criterion for Composition Operators

John Akeroyd

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TL;DR

This paper provides a new expression for Shapiro's compactness criterion of composition operators on Hardy spaces, linking it to measure-theoretic concepts and offering applications.

Contribution

It introduces an alternative formula for the essential norm of composition operators, connecting Shapiro's criterion with measure-theoretic notions.

Findings

01

New expression for the essential norm involving boundary behavior

02

Link between Shapiro's criterion and measure-theoretic concepts

03

Applications demonstrating the utility of the new formula

Abstract

For any analytic self-map $ψ$ of ${z : ∣ z ∣ < 1}$ , J. H. Shapiro has established that the square of the essential norm of the composition operator $C_{ψ}$ on the Hardy Space $H^{2}$ is precisely $lim sup_{∣ w ∣ \to 1^{-}} N_{ψ} (w) / (1 - ∣ w ∣)$ ; where $N_{ψ}$ is the Nevanlinna counting function for $ψ$ . In this paper we show that this quantity is equal to $lim sup_{∣ a ∣ \to 1^{-}} (1 - ∣ a ∣^{2}) ∣∣1/ (1 - \overset{a}{ˉ} ψ) ∣ ∣_{H^{2}}^{2} .$ This alternative expression provides a link between the one given by Shapiro and earlier measure-theoretic notions. Applications are given.

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Taxonomy

TopicsHolomorphic and Operator Theory · Algebraic and Geometric Analysis · Meromorphic and Entire Functions