Boundary value problems for semilinear Schr\"odinger equations with singular potentials and measure data
Abstract
We study boundary value problems with measure data in smooth bounded domains , for semilinear equations involving Hardy type potentials. Specifically we consider problems of the form -LV u + f(u) = τ in and tr*u= on ∂ , where LV= +V, f∈ C(R) is monotone increasing with f(0)=0 and tr*u denotes the normalized boundary trace of u associated with LV. The potential V is typically a H\"older continuous function in that explodes as dist(x,F)-2 for some F ⊂ ∂ . In general the above boundary value problem may not have a solution. We are interested in questions related to the concept of 'reduced measures', introduced by Brezis, Marcus and Ponce for V=0. For positive measures, the reduced measures τ*, * are the largest measures dominated by τ and respectively such that the boundary value problem with data (τ*,*) has a solution. Our results extend results for the case V=0, including a relaxation of the conditions on f. In the case of signed measures, some of the present results are new even for V=0.
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