Inner functions, Möbius distortion and angular derivatives

Bampouras, K.; artur, nicolau; Bampouras, K.; artur, nicolau

doi:10.1007/s11854-025-0408-x

Inner functions, Möbius distortion and angular derivatives

Author

Bampouras, K.

artur, nicolau

Publication date

2025-12-15

Abstract

We prove that an inner function has finite L(p)-entropy if and only if its accumulated Mobius distortion is in L-p, 0 < p < infinity. We also study the support of the positive singular measures such that their corresponding singular inner functions have finite L(p)-entropy.

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Article

Document version

Published version

Language

English

CDU Subject

511 - Number theory

Subject

Mobius distortion

Pages

18 p.

Publisher

Springer

Published in

Journal d'Analyse Mathématique

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Inner functions, Möbius distortion and angular derivatives

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