Confluences of the Painleve equations, Cherednik algebras and q-Askey scheme

TL;DR

This paper introduces new confluent Cherednik algebras and demonstrates their connection to Painlevé equations and the q-Askey scheme, revealing a novel algebraic framework linking special functions, differential equations, and quantum algebra structures.

Contribution

It constructs seven new confluent Cherednik algebras, characterizes their spherical sub-algebras, and links them to Painlevé monodromy manifolds and the q-Askey scheme.

Findings

New confluent Cherednik algebras constructed

Spherical sub-algebras linked to Painlevé monodromy manifolds

Confluent Zhedanov algebras act as symmetries in the q-Askey scheme

Abstract

In this paper we produce seven new algebras as confluences of the Cherednik algebra of type \check{C_1}C_1 and we characterise their spherical-sub-algebras. The limit of the spherical sub-algebra of the Cherednik algebra of type \check{C_1}C_1 is the monodromy manifold of the Painlev\'e VI equation. Here we prove that by considering the limits of the spherical sub-algebras of our new confluent algebras, one obtains the monodromy manifolds of all other Painlev\'e differential equations. Moreover, we introduce confluent versions of the Zhedanov algebra and prove that each of them (quotiented by their Casimir) is isomorphic to the corresponding spherical sub-algebra of our new confluent Cherednik algebras. We show that in the basic representation our confluent Zhedanov algebras act as symmetries of certain elements of the q-Askey scheme, thus setting a stepping stone towards the solution of the open problem of finding the corresponding quantum algebra for each element of the q-Askey scheme. These results establish a new link between the theory of the Painlev\'e equations and the theory of the q-Askey scheme and shed light on the reasons behind the occurrence of special polynomials in the Painlev\'e theory.