A special case of a conjecture of Hellerstein, Shen and Williamson

J.K. Langley

arXiv:2204.02702·math.CV·September 6, 2023

A special case of a conjecture of Hellerstein, Shen and Williamson

J.K. Langley

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TL;DR

This paper proves a specific case of a conjecture related to the distribution of non-real zeros in derivatives of real meromorphic functions, advancing understanding in complex analysis.

Contribution

It establishes a particular instance of the conjecture, providing new insights into the zeros of derivatives of real meromorphic functions.

Findings

01

Confirmed a special case of the conjecture.

02

Enhanced understanding of zeros of derivatives.

03

Contributed to complex analysis theory.

Abstract

The paper proves a special case of a conjecture of Hellerstein, Shen and Williamson concerning non-real zeros of derivatives of real meromorphic functions.

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Taxonomy

TopicsMeromorphic and Entire Functions · Advanced Differential Equations and Dynamical Systems · Holomorphic and Operator Theory