Asymptotic behavior of ground state solutions to nonlinear elliptic problems with the fractional Laplacian

Abstract

In this paper, we consider the asymptotic behavior of the ground state solution us of the nonlinear fractional Laplacian equation equationeq:0.1a (-)su+Vu=|u|p-2u x∈ Rn equation by taking s as a parameter, where n≥ 4, 2<p<2nn-2, V is a potential function. We show that for a fixed p, there exists s0∈(0,1) such that equation eq:0.1a admits a ground state solution us if and only if s0<s<1. Our main results give a description of the asymptotic behavior of us as s1 and s s0: us converges to a function as s1, and it blows up as s s0. Particularly, we prove that us concentrates at a minimum point of the function V as s s0. The local uniqueness of us is also given.