English

On Shapiro's Compactness Criterion for Composition Operators

Complex Variables 2010-08-19 v1 Functional Analysis

Abstract

For any analytic self-map ψ\psi of {z:z<1}\{z: |z| < 1\}, J. H. Shapiro has established that the square of the essential norm of the composition operator CψC_\psi on the Hardy Space H2H^2 is precisely lim supw1Nψ(w)/(1w)\limsup_{|w|\rightarrow 1^-}N_\psi(w)/(1-|w|); where NψN_\psi is the Nevanlinna counting function for ψ\psi. In this paper we show that this quantity is equal to lim supa1(1a2)1/(1aˉψ)H22.\limsup_{|a|\rightarrow 1^-}(1 - |a|^2)||1/(1 - \bar{a}\psi)||_{H^2}^2. This alternative expression provides a link between the one given by Shapiro and earlier measure-theoretic notions. Applications are given.

Keywords

Cite

@article{arxiv.1008.3131,
  title  = {On Shapiro's Compactness Criterion for Composition Operators},
  author = {John Akeroyd},
  journal= {arXiv preprint arXiv:1008.3131},
  year   = {2010}
}
R2 v1 2026-06-21T16:02:29.920Z