Liouville Theorem for Dunkl Polyharmonic Functions

Abstract

Assume that f is Dunkl polyharmonic in Rn (i.e. (h)p f=0 for some integer p, where h is the Dunkl Laplacian associated to a root system R and to a multiplicity function , defined on R and invariant with respect to the finite Coxeter group). Necessary and successful condition that f is a polynomial of degree s for s 2p-2 is proved. As a direct corollary, a Dunkl harmonic function bounded above or below is constant.