On sharp aperture-weighted estimates for square functions

Abstract

Let S,(f) be the square function defined by means of the cone in Rn+1+ of aperture , and a standard kernel . Let [w]Ap denote the Ap characteristic of the weight w. We show that for any 1<p<∞ and 1, \|S,\|Lp(w) n[w]Ap(1/2,1p-1). For each fixed the dependence on [w]Ap is sharp. Also, on all class Ap the result is sharp in . Previously this estimate was proved in the case =1 using the intrinsic square function. However, that approach does not allow to get the above estimate with sharp dependence on . Hence we give a different proof suitable for all 1 and avoiding the notion of the intrinsic square function.