Quadratic sparse domination and Weighted Estimates for non-integral Square Functions

Abstract

We prove a quadratic sparse domination result for general non-integral square functions S. That is, we prove an estimate of the form equation* ∫M (S f)2 g \, dμ c ΣP ∈ S (1 5P ∫5 P fp0 \, dμ)2/p0 (1 5P ∫5 P gq0*\,dμ)1/q0* P, equation* where q0* is the H\"older conjugate of q0/2, M is the underlying doubling space and S is a sparse collection of cubes on M. Our result will cover both square functions associated with divergence form elliptic operators and those associated with the Laplace-Beltrami operator. This sparse domination allows us to derive optimal norm estimates in the weighted space Lp(w).