Nonlocal Kirchhoff superlinear equations with indefinite nonlinearity and lack of compactness
Abstract
We study the following Kirchhoff equation - (1 + b ∫R3 |∇ u|2 dx ) u + V(x) u = f(x,u), \ x ∈ R3. A special feature of this paper is that the nonlinearity f and the potential V are indefinite, hence sign-changing. Under some appropriate assumptions on V and f, we prove the existence of two different solutions of the equation via the Ekeland variational principle and Mountain Pass Theorem.
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