Boundary value problems and Hardy spaces for singular Schr\"odinger equations with block structure

Abstract

We obtain Riesz transform bounds and characterise operator-adapted Hardy spaces to solve boundary value problems for singular Schr\"odinger equations -div(A∇ u)+aVu=0 in the upper half-space R1+n+ with boundary dimension n≥ 3. The coefficients (A,a,V) are assumed to be independent of the transversal direction to the boundary, and consist of a complex-elliptic pair (A,a) that is bounded and measurable with a certain block structure, and a non-negative singular potential V in the reverse H\"older class RHq(Rn) for q≥ \n2,2\. This block structure is significant because it allows for coefficients that are not symmetric but for which L2(Rn)-solvability persists due to recently obtained Kato square root type estimates. We find extrapolation intervals for exponents p around 2 on which the Dirichlet problem is well-posed for boundary data in Lp(Rn), and the associated Regularity problem is well-posed for boundary data in Sobolev spaces V1,p(Rn) that are adapted to the potential V, when p>1. The well-posedness of these Dirichlet problems and related estimates then allow us to solve the corresponding Neumann problem with boundary data in Lp. The results permit boundary data in the Dziuba\`nski--Zienkiewicz Hardy space H1V(Rn) and adapted Hardy--Sobolev spaces H1,pV(Rn) when p≤ 1. We also obtain comparability of square functions and nontangential maximal functions for the solutions with their boundary data.

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