Existence of solutions for a nonlinear Choquard equation with potential vanishing at infinity
Abstract
We study the following class of nonlinear Choquard equation, - u +V(x)u =( 1|x|μ F(u))f(u) in N, where 0<μ<N, N ≥ 3, V is a continuous real function and F is the primitive function of f. Under some suitable assumptions on the potential V, which include the case V(∞)=0, that is, V(x) 0 as |x| +∞, we prove existence of a nontrivial solution for the above equation by penalization method.
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