Interior Lp-estimates for elliptic and parabolic Schr\"odinger type operators and local Ap-weights
Abstract
Let Omega be a non-empty open proper and connected subset of Rn. Consider p elliptic Schr\"odinger type operator LEu=AEu+V in Omega, and the linear parabolic operator LPu=APu+Vu in Omega x (0,T), where the coefficients of AE and AP are in VMO and the potential V satisfies a reverse-H\"older condition. The aim of this paper is to obtain a priori estimates for the operators LE and LP in weighted Sobolev spaces involving the distance to the boundary and weights in a local-A class.
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