Weighted Lp Estimates of Kato Square Roots Associated to Degenerate Elliptic Operators

Abstract

Let w be a Muckenhoupt A2(Rn) weight and Lw:=-w-1(A∇) the degenerate elliptic operator on the Euclidean space Rn, n≥ 2. In this article, the authors establish some weighted Lp estimates of Kato square roots associated to the degenerate elliptic operators Lw. More precisely, the authors prove that, for w∈ Ap(Rn), p∈(2nn+1,\,2] and any f∈ C∞c(Rn), \|Lw1/2(f)\|Lp(w,\,Rn) \|∇ f\|Lp(w,\,Rn), where Cc∞(Rn) denotes the set of all infinitely differential functions with compact supports.