On the Schr\"odinger equations with B∞ potentials in the region above a Lipschitz graph
Abstract
In this paper we investigate the Lp regularity, Lp Neumann and W1,p problems for generalized Schr\"odinger operator -div(A∇ )+ V in the region above a Lipschitz graph under the assumption that A is elliptic, symmetric and xd-independent. Specifically, we prove that the Lp regularity problem is uniquely solvable for 1<p<2+. Moreover, we also establish the W1,p estimate for Neumann problem for 32-<p<3+. As a by-product, we also obtain that the Lp Neumann problem is uniquely solvable for 1<p<2+. The only previously known estimates of this type pertain to the classical Schr\"odinger equation - u+ Vu=0 in and ∂ u∂ n=g on ∂ which was obtained by Shen [Z. Shen, On the Neumann problem for Schr\"odinger operators in Lipschitz domains, Indiana Univ. Math. J. 43 (1994)] for ranges 1<p≤ 2. All the ranges of p are sharp.
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