Characterizations of H1 and Fefferman-Stein decompositions of BMO functions by systems of singular integrals in the Dunkl setting
Abstract
We extend the classical theorem of Uchiyama about constructive Fefferman-Stein decompositions of BMO functions by systems of singular integrals to the rational Dunkl setting. On RN equipped with a root system R and a multiplicity function k ≥ 0, let \[ dw(x) = Πα ∈ R | α, x |k(α) \, dx \] denote the associated measure, and let F stand for the Dunkl transform. Consider a system (θ0, θ1, θ2, …, θd) of functions on RN that are smooth away from the origin and homogeneous of degree zero, with θ0() 1. We prove that if \[ rank ( arrayccccc 1 & θ1() & θ2() & … & θd() \\ 1 & θ1(-) & θ2(-) & … & θd(-) array ) = 2 for all ∈ RN with \|\| = 1, \] then any compactly supported BMO(RN, \|x - y\|, dw) function f can be decomposed into \[ f = g0 + Σj=1d S\j\ gj, \| Σj=0d gj \|L∞ ≤ C \|f\| BMO, \] where S\j\ g = F-1(θj Fg). As a corollary, we obtain characterizations of the Hardy space H1 Dunkl by the system of singular integral operators ( Id, S\1\, S\2\, …, S\d\).
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