Dunkl paraproducts and fractional Leibniz rules for the Dunkl Laplacian

Abstract

We establish fractional Leibniz rules for the Dunkl Laplacian k of the form \|(-k)s(fg)\|Lp(dμk) \|(-k)s f\|Lp1(dμk) \|g\|Lp2(dμk) + \|f\|Lp1(dμk) \|(-k)s g\|Lp2(dμk). Our approach relies on adapting the classical paraproduct decomposition to the Dunkl setting. In the process, we develop several new auxiliary results. Specifically, we show that for a Schwartz function f, the function (-k)s f satisfies a pointwise decay estimate; we establish a version of almost orthogonality estimates adapted to the Dunkl framework; and we investigate the boundedness of Dunkl paraproduct operators on the Lebesgue spaces.