Boundedness of differential transforms for heat semigroups generated by fractional Laplacian

Abstract

In this paper we analyze the convergence of the following type of series equation* TN f(x)=Σj=N1N2 vj(e-aj+1(-)α f(x)-e-aj(-)α f(x)), x∈ Rn, equation* where \e-t(-)α \t>0 is the heat semigroup of the fractional Laplacian (-)α, N=(N1, N2)∈ Z2 with N1<N2, \vj\j∈ Z is a bounded real sequences and \aj\j∈ Z is an increasing real sequence. Our analysis will consist in the boundedness, in Lp(Rn) and in BMO(Rn), of the operators TN and its maximal operator T*f(x)= N |TN f(x)|. It is also shown that the local size of the maximal differential transform operators is the same with the order of a singular integral for functions f having local support.