A characterization of two weight norm inequality for Littlewood-Paley gλ*-function

Abstract

Let n 2 and gλ* be the well-known high dimensional Littlewood-Paley function which was defined and studied by E. M. Stein, align* gλ*(f)(x) =( Rn+1+ (tt+|x-y|)nλ |∇ Ptf(y,t)|2 dy dttn-1)1/2, \ λ > 1, align* where Ptf(y,t)=pt*f(y), pt(y)=t-np(y/t) and p(x) = (1+|x|2)-(n+1)/2, ∇ =(∂∂ y1,…,∂∂ yn,∂∂ t). In this paper, we give a characterization of two-weight norm inequality for gλ*-function. We show that, \| gλ*(f σ) \|L2(w) \| f \|L2(σ) if and only if the two-weight Muchenhoupt A2 condition holds, and a testing condition holds : align* Q : cubes \ in Rn 1σ(Q) ∫ Rn Q (tt+|x-y|)nλ|∇ Pt(1Q σ)(y,t)|2 w dx dttn-1 dy < ∞, align* where Q is the Carleson box over Q and (w, σ) is a pair of weights. We actually prove this characterization for gλ*-function associated with more general fractional Poisson kernel pα(x) = (1+|x|2)-(n+α)/2. Moreover, the corresponding results for intrinsic gλ*-function are also presented.