Note on semiclassical states for the Schr\"odinger equation with nonautonomous nonlinearities
Abstract
We consider the following Schr\"odinger equation - 2 u + V(x)u = (x) f(u) in \ RN, where u ∈ H1 (RN), u > 0, > 0 and f is superlinear and subcritical nonlinear term. We show that if V attains local minimum and attains global maximum at the same point or V attains global minimum and attains local maximum at the same point, then there exists a positive solution for sufficiently small >0.
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