English

A Relativistic Conical Function and its Whittaker Limits

Classical Analysis and ODEs 2011-11-02 v1 Mathematical Physics math.MP Quantum Algebra Exactly Solvable and Integrable Systems

Abstract

In previous work we introduced and studied a function R(a+,a,c;v,v^)R(a_{+},a_{-},{\bf c};v,\hat{v}) that is a generalization of the hypergeometric function 2F1{}_2F_1 and the Askey-Wilson polynomials. When the coupling vector cC4{\bf c}\in{\mathbb C}^4 is specialized to (b,0,0,0)(b,0,0,0), bCb\in{\mathbb C}, we obtain a function R(a+,a,b;v,2v^){\mathcal R}(a_{+},a_{-},b;v,2\hat{v}) that generalizes the conical function specialization of 2F1{}_2F_1 and the qq-Gegenbauer polynomials. The function R{\mathcal R} is the joint eigenfunction of four analytic difference operators associated with the relativistic Calogero-Moser system of A1A_1 type, whereas the function RR corresponds to BC1BC_1, and is the joint eigenfunction of four hyperbolic Askey-Wilson type difference operators. We show that the R{\mathcal R}-function admits five novel integral representations that involve only four hyperbolic gamma functions and plane waves. Taking their nonrelativistic limit, we arrive at four representations of the conical function. We also show that a limit procedure leads to two commuting relativistic Toda Hamiltonians and two commuting dual Toda Hamiltonians, and that a similarity transform of the function R{\mathcal R} converges to a joint eigenfunction of the latter four difference operators.

Cite

@article{arxiv.1111.0115,
  title  = {A Relativistic Conical Function and its Whittaker Limits},
  author = {Simon Ruijsenaars},
  journal= {arXiv preprint arXiv:1111.0115},
  year   = {2011}
}
R2 v1 2026-06-21T19:28:55.407Z