Lipschitz and Triebel--Lizorkin spaces, commutators in Dunkl setting

Abstract

We first study the Lipschitz spaces dβ associated with the Dunkl metric, β∈(0,1), and prove that it is a proper subspace of the classical Lipschitz spaces β on RN, as the Dunkl metric and the Euclidean metric are non-equivalent. Next, we further show that the Lipschitz spaces β connects to the Triebel--Lizorkin spaces Fα,qp, D associated with the Dunkl Laplacian D in R N and to the commutators of the Dunkl Riesz transform and the fractional Dunkl Laplacian D-α/2, 0<α<N (the homogeneous dimension for Dunkl measure), which is represented via the functional calculus of the Dunkl heat semigroup e-t D. The key steps in this paper are a finer decomposition of the underlying space via Dunkl metric and Euclidean metric to bypass the use of Fourier analysis, and a discrete weak-type Calder\'on reproducing formula in these new Triebel--Lizorkin spaces Fα,qp, D.