Weighted variational inequalities for the fractional Dunkl heat semigroup

Abstract

We investigate the convergence properties of the family of operators T N f(x)=Σj=N1N2 vj( e-aj+1(-Δk)sf(x) - e-aj(-Δk)sf(x) ), x∈Rd, where \e-t(-Δk)s\t>0 denotes the fractional heat semigroup generated by the Dunkl Laplacian Δk. Here N=(N1,N2)∈Z2, N1<N2, the coefficients \vj\j∈Z form a bounded sequence of real numbers, and \aj\j∈Z is a monotone increasing sequence of reals. The primary objective of this work is to establish boundedness results for these differential transform operators on weighted Lp(Rd,dμk) spaces as well as on Dunkl BMO(Rd) spaces. We also establish analogous boundedness properties for the associated maximal operator T* f(x)= N |T N f(x)| and study the pointwise convergence of the corresponding series. In addition, we prove that, for compactly supported functions, the maximal differential transform operator T* exhibits local behaviour comparable to that of classical singular integral operators.