Zeros transfer for recursively defined polynomials

IF 0.6 Q3 MATHEMATICS Research in Number Theory Pub Date : 2023-11-08 DOI:10.1007/s40993-023-00480-8
Bernhard Heim, Markus Neuhauser, Robert Tröger
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引用次数: 1

Abstract

Abstract The zeros of D’Arcais polynomials, also known as Nekrasov–Okounkov polynomials, dictate the vanishing of the Fourier coefficients of powers of the Dedekind eta functions. These polynomials satisfy difference equations of hereditary type with non-constant coefficients. We relate the D’Arcais polynomials to polynomials satisfying a Volterra difference equation of convolution type. We obtain results on the transfer of the location of the zeros. As an application, we obtain an identity between Chebyshev polynomials of the second kind and 1-associated Laguerre polynomials. We obtain a new version of the Lehmer conjecture and bounds for the zeros of the Hermite polynomials.
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递归定义多项式的零转移
D 'Arcais多项式(也称为Nekrasov-Okounkov多项式)的零表示Dedekind函数幂的傅里叶系数的消失。这些多项式满足非常系数遗传型差分方程。我们将D 'Arcais多项式与满足卷积型Volterra差分方程的多项式联系起来。我们得到了关于零位置转移的结果。作为应用,我们得到了第二类切比雪夫多项式与1相关拉盖尔多项式之间的恒等式。我们得到了Lehmer猜想的一个新版本和Hermite多项式的零点界。
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来源期刊
CiteScore
0.80
自引率
12.50%
发文量
88
期刊介绍: Research in Number Theory is an international, peer-reviewed Hybrid Journal covering the scope of the mathematical disciplines of Number Theory and Arithmetic Geometry. The Mission of the Journal is to publish high-quality original articles that make a significant contribution to these research areas. It will also publish shorter research communications (Letters) covering nascent research in some of the burgeoning areas of number theory research. This journal publishes the highest quality papers in all of the traditional areas of number theory research, and it actively seeks to publish seminal papers in the most emerging and interdisciplinary areas here as well. Research in Number Theory also publishes comprehensive reviews.
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