Nonlocal scalar field equations: qualitative properties, asymptotic profiles and local uniqueness of solutions

Abstract

We study the nonlocal scalar field equation with a vanishing parameter \[ \arraylll (-)s u+ε u &=|u|p-2u -|u|q-2u N \\ u >0, & u ∈ Hs(RN), array . \] where s∈(0,1), N>2s, q>p>2 are fixed parameters and ε>0 is a vanishing parameter. For ε>0 small, we prove the existence of a ground state solution and show that any positive solution of above problem is a classical solution and radially symmetric and symmetric decreasing. We also obtain the decay rate of solution at infinity. Next, we study the asymptotic behavior of ground state solutions when p is subcritical, supercritical or critical Sobolev exponent 2*=2NN-2s. For p<2*, the solution asymptotically coincides with unique positive ground state solution of (-)s u+u=up. On the other hand, for p=2* the asymptotic behaviour of the solutions is given by the unique positive solution of the nonlocal critical Emden-Fowler type equation. For p>2*, the solution asymptotically coincides with a ground-state solution of (-)s u=up-uq. Furthermore, using these asymptotic profile of solutions, we prove the local uniqueness of solution in the case p≤ 2*.