Bull. Korean Math. Soc. 2022; 59(5): 1269-1277
Online first article June 29, 2022 Printed September 30, 2022
https://doi.org/10.4134/BKMS.b210728
Copyright © The Korean Mathematical Society.
Art\= uras Dubickas
Naugarduko 24
In this paper we consider a sequence of polynomials defined by some recurrence relation. They include, for instance, Poupard polynomials and Kreweras polynomials whose coefficients have some combinatorial interpretation and have been investigated before. Extending a recent result of Chapoton and Han we show that each polynomial of this sequence is a self-reciprocal polynomial with positive coefficients whose all roots are unimodular. Moreover, we prove that their arguments are uniformly distributed in the interval $[0,2\pi)$.
Keywords: Self-reciprocal polynomials, unimodular roots, trigonometric polynomials
MSC numbers: Primary 12D10, 26C10, 42A05
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