On the nonexistence of Green's function and failure of the strong maximum principle
Abstract
Given any Borel function V : [0, +∞] on a smooth bounded domain ⊂ RN, we establish that the strong maximum principle for the Schr\"odinger operator - + V in holds in each Sobolev-connected component of Z, where Z ⊂ is the set of points which cannot carry a Green's function for - + V. More generally, we show that the equation - u + V u = μ has a distributional solution in W01, 1() for a nonnegative finite Borel measure μ if and only if μ(Z) = 0.
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