Baker-Akhiezer specialisation of joint eigenfunctions for hyperbolic relativistic Calogero-Moser Hamiltonians

Abstract

In earlier joint work with Ruijsenaars, we constructed and studied symmetric joint eigenfunctions JN for quantum Hamiltonians of the hyperbolic relativistic N-particle Calogero--Moser system. For generic coupling values, they are non-elementary functions that in the N=2 case essentially amount to a `relativistic' generalisation of the conical function specialisation of the Gauss hypergeometric function 2F1. In this paper, we consider a discrete set of coupling values for which the solution to the joint eigenvalue problem is known to be given by functions N of Baker--Akhiezer type, which are elementary, but highly nontrivial, functions. Specifically, we show that JN essentially amounts to the antisymmetrisation of N and, as a byproduct, we obtain a recursive construction of N in terms of an iterated residue formula.