On semigroups generated by sums of even powers of Dunkl operators

Abstract

On the Euclidean space RN equipped with a normalized root system R, a multiplicity function k≥ 0, and the associated measure dw( x)=Πα∈ R | x,α|k(α)d x we consider the differential-difference operator L=(-1)+1 Σj=1m Tζj2, where ζ1,...,ζm are nonzero vectors in RN, which span RN, and Tζj are the Dunkl operators. The operator L is essentially self-adjoint on L2(dw) and generates a semigroup \St\t ≥ 0 of linear self-adjoint contractions, which has the form Stf( x)=f*qt(x), qt( x)=t- N/ (2)q( x/ t1/ (2)), where q( x) is the Dunkl transform of the function (-Σj=1m ζj,2). We prove that q( x) satisfies the following exponential decay: |q( x)| (-c \| x\|2/ (2-1)) for a certain constant c>0. Moreover, if q( x, y)=τ xq(- y), then |q( x, y)| w(B( x,1))-1 (-c d( x, y)2 / (2-1)), where d( x, y)=σ∈ G\| x- σ( y)\| , G~is the reflection group for R, and τ x denotes the Dunkl translation.