Ground state solutions for asymptotically linear Schrödinger equations
on locally finite graphs
Abstract
We are considered with the following nonlinear Schrödinger equation −∆
u+( λa( x)+1) u= f( u)
,x∈ V, on a locally finite graph G=( V,E),
where V denotes the vertex set, E denotes the edge set,
λ>1 is a parameter, f( s) is
asymptotically linear with respect to s at infinity, and the
potential a: V→[0 ,+∞) has a nonempty well Ω. By
using variational methods we prove that the above problem has a ground
state solution u λ for any λ>1. Moreover, we show
that as λ→∞, the ground state solution u λ converges to a ground
state solution of a Dirichlet problem defined on the potential well Ω.