Rational Heun operators on q-linear grids

Abstract

Rational Heun operators on the q-linear grid are presented. They are second-order q-difference operators Wq constructively defined from the requirement that they have a raising action on rational functions of type [n/n], namely Wq: [n/n] → [n+1/n+1], with poles on q-linear grids. It will be observed that these operators are related to one family of the Ruijsenaars-van Diejen-Takemura Hamiltonians. A distinguished subclass of Wq called classical which shifts the pole structure while preserving the rational function type and a prescribed basis is also characterized.