Thomas Chouteau, Sofia Tarricone, “Recursion Relation for Toeplitz Determinants and the Discrete Painlevé II Hierarchy”, SIGMA, 2023, Volume 19,030, 30 pp.

This article is cited in 2 papers

Recursion Relation for Toeplitz Determinants and the Discrete Painlevé II Hierarchy

Thomas Chouteau^a, Sofia Tarricone^b

^a Université d’Angers, CNRS, LAREMA, SFR MATHSTIC, F-49000 Angers, France
^b Institut de Physique Théorique, Université Paris-Saclay, CEA, CNRS, F-91191 Gif-sur-Yvette, France

Abstract: Solutions of the discrete Painlevé II hierarchy are shown to be in relation with a family of Toeplitz determinants describing certain quantities in multicritical random partitions models, for which the limiting behavior has been recently considered in the literature. Our proof is based on the Riemann–Hilbert approach for the orthogonal polynomials on the unit circle related to the Toeplitz determinants of interest. This technique allows us to construct a new Lax pair for the discrete Painlevé II hierarchy that is then mapped to the one introduced by Cresswell and Joshi.

Keywords: discrete Painlevé equations, orthogonal polynomials, Riemann–Hilbert problems, Toeplitz determinants.

MSC: 33E17, 33C47, 35Q15

Received: December 22, 2022; in final form May 16, 2023; Published online May 28, 2023

Language: English

DOI: 10.3842/SIGMA.2023.030