A note on commutators of singular integrals with BMO and VMO functions in the Dunkl setting

Abstract

On RN equipped with a root system R, multiplicity function k ≥ 0, and the associated measure dw(x)=Πα ∈ R| x,α|k(α)\,dx, we consider a (non-radial) kernel K(x) which has properties similar to those from the classical theory of singular integrals and the Dunkl convolution operator Tf=f*K associated with K. Assuming that b belongs to the BMO space on the space of homogeneous type X=(RN,\|·\|,dw), we prove that the commutator [b,T]f(x)=b(x)Tf(x)-T(bf)(x) is a bounded operator on Lp(dw) for all 1<p<∞. Moreover, [b, T] is compact on Lp(dw), provided b∈ VMO (X). The paper extents results of Han, Lee, Li and Wick.