Liouville type results for a nonlocal obstacle problem
Abstract
This paper is concerned with qualitative properties of solutions to nonlocal reaction-diffusion equations of the form ∫\RN K J(x-y)\,( u(y)-u(x) )\, y+f(u(x))=0, x∈N K,set in a perforated open set RN K, where K⊂RN is a bounded compact "obstacle" and f is a bistable nonlinearity. When K is convex, we prove some Liouville-type results for solutions satisfying some asymptotic limiting conditions at infinity. We also establish a robustness result, assuming slightly relaxed conditions on K.
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