Lp-mapping properties for Schr\"odinger operators in open sets of R d
Abstract
Let HV=- +V be a Schr\"odinger operator on an arbitrary open set of Rd, where d ≥ 3, and is the Dirichlet Laplacian and the potential V belongs to the Kato class on . The purpose of this paper is to show Lp-boundedness of an operator (HV) for any rapidly decreasing function on R. (HV) is defined by the spectral theorem. As a by-product, Lp-Lq-estimates for (HV) are also obtained.
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