Boundedness of differential transforms for one-sided fractional Poisson-type operator sequence

Abstract

In this paper, we analyze the convergence speed of a series related with Pτα f by discussing the behavior of the family of operators equation* TNα f(t) = Σj=N1N2 vj(Paj+1α f(t)-Pajα f(t)), ~N=(N1,N2)∈ Z2 with N1<N2, equation* where \vj\j∈ Z is a bounded number sequence, and \aj\j∈ Z is a -lacunary sequence of positive numbers, that is, 1< ≤ aj+1/aj, for all\ j∈ Z. We shall show the boundedness of the maximal operator equation*T*f(t)=N |TNα f(t)|, t∈R, equation* in the one-sided weighted Lebesgue spaces Lp(R,ω)(ω ∈ Ap-), 1< p < ∞. As a consequence we infer the existence of the limit, in norm and almost everywhere, of the family TNα f for functions in Lp(R,ω). Results for L1(R,ω)(ω ∈ A1-), L∞(R) and BMO(R) are also obtained. It is also shown that the local size of T*f, for functions f having local support, is the same with the order of a singular integral. Moreover, if \vj\j∈ Z∈ p( Z), we get an intermediate size between the local size of singular integrals and Hardy-Littlewood maximal operator.