Existence and multiplicity results for a class of Kirchhoff-Choquard equations with a generalized sign-changing potential

Abstract

In the present work we are concerned with the following Kirchhoff-Choquard-type equation -M(||∇ u||22) u +Q(x)u + μ(V(|·|) u2)u = f(u) in R2 , for M: R → R given by M(t)=a+bt, μ >0 , V a sign-changing and possible unbounded potential, Q a continuous external potential and a nonlinearity f with exponential critical growth. We prove existence and multiplicity of solutions in the nondegenerate case and guarantee the existence of solutions in the degenerate case.

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