Existence and Concentration Results for the General Kirchhoff Type Equations
Abstract
We consider the following singularly perturbed Kirchhoff type equations -2 M(2-N∫N|∇ u|2 dx) u +V(x)u=|u|p-2u~in~N, u∈ H1(N),N≥ 1, where M∈ C([0,∞)) and V∈ C(N) are given functions. Under very mild assumptions on M, we prove the existence of single-peak or multi-peak solution u for above problem, concentrating around topologically stable critical points of V, by a direct corresponding argument. This gives an affirmative answer to an open problem raised by Figueiredo et al. in 2014 [ARMA,213].
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