M. Riesz-Schur-type inequalities for entire functions of exponential   type

Tamas Erdelyi; Michael I. Ganzburg; and Paul Nevai

arXiv:1406.3664·math.CV·June 17, 2014

M. Riesz-Schur-type inequalities for entire functions of exponential type

Tamas Erdelyi, Michael I. Ganzburg, and Paul Nevai

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TL;DR

This paper establishes a new inequality of M. Riesz-Schur type applicable to entire functions of exponential type, expanding the theoretical understanding of these functions.

Contribution

It introduces a generalized M. Riesz-Schur-type inequality specifically for entire functions of exponential type, broadening existing mathematical frameworks.

Findings

01

Proves a new inequality for entire functions of exponential type

02

Extends classical Riesz-Schur inequalities to a broader class of functions

03

Provides theoretical tools for further analysis of exponential type functions

Abstract

We prove a general M. Riesz-Schur-type inequality for entire functions of exponential type.

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Taxonomy

TopicsMeromorphic and Entire Functions · Analytic and geometric function theory · Mathematics and Applications