Local uniqueness of multi-peak positive solutions to a class of fractional Kirchhoff equations

Abstract

This paper has two main purposes. In the first part, combining the nondegeneracy of the ground state with the Lyapunov--Schmidt reduction method, we prove the existence of multi-peak positive solutions to the singularly perturbed problem \[(2sa+4s-N b∫RN|(-)s2u|2\,dx)(-)s u+V(x)u=up in RN,\] for all sufficiently small > 0, under the assumptions 2s<N<4s, 1<p<2*s-1, and some mild conditions on the potential V. The main difficulty comes from the interplay between the nonlocal operator (-)s and the nonlocal Kirchhoff term, which makes the corresponding limiting problem a coupled system of partial differential equations rather than a single fractional Kirchhoff equation. In the second part, under additional assumptions on V, we establish the local uniqueness of positive multi-peak solutions by means of a local Pohozaev identity.