Localized semiclassical states for Hamiltonian elliptic systems in dimension two
Abstract
In this paper, we consider the Hamiltonian elliptic system in dimension twoequation1.5 \ arraylll -ε2 u+V(x)u=g(v)\ & in R2,\\ -ε2 v+V(x)v=f(u)\ & in R2, array. equation where V∈ C(R2) has local minimum points, and f,g∈ C1(R) are assumed to be either superlinear or asymptotically linear at infinity and of subcritical exponential growth in the sense of Trudinger-Moser inequality. Under only a local condition on V, we obtain a family of semiclassical states concentrating around local minimum points of V. In addition, in the case that f and g are superlinear at infinity, the decay and positivity of semiclassical states are also given. The proof is based on a reduction method, variational methods and penalization techniques.
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