Difference-elliptic operators and root systems

Abstract

Recently a new technique in the harmonic analysis on symmetric spaces was suggested based on certain remarkable representations of affine and double affine Hecke algebras in terms of Dunkl and Demazure operators instead of Lie groups and Lie algebras. In the classic case it resulted (among other applications) in a new theory of radial part of Laplace operators and their deformations including a related concept of the Fourier transform. In the present paper we demonstrate that the new technique works well even in the most general difference-elliptic case conjecturally corresponding to the $q$-Kac-Moody algebras. We discuss here only the construction of the generalized radial (zonal) Laplace operators and connect them with the difference-elliptic Ruijsenaars operators generalizing in its turn the Olshanetsky-Perelomov differential elliptic operators.