Existence and convergence of solutions for nonlinear biharmonic equations on graphs

Abstract

In this paper, we first prove some propositions of Sobolev spaces defined on a locally finite graph G=(V,E), which are fundamental when dealing with equations on graphs under the variational framework. Then we consider a nonlinear biharmonic equation 2 u - u+(λ a+1)u= |u|p-2u on G=(V,E). Under some suitable assumptions, we prove that for any λ>1 and p>2, the equation admits a ground state solution uλ. Moreover, we prove that as λ→ +∞, the solutions uλ converge to a solution of the equation align* cases 2u - u+u = |u|p-2u, &in\ \ , u=0, &on\ \ ∂, cases align* where =\x∈ V: a(x)=0\ is the potential well and ∂ denotes the the boundary of .