A new type of bubble solutions for a critical fractional Schr\"odinger equation

Abstract

We consider the following critical fractional Schr\"odinger equation equation* (-)s u+V(|y'|,y'')u = u2s*-1, u>0, y =(y',y'') ∈ R3×RN-3, equation* where N≥ 3,s∈(0,1), 2s*=2NN-2s is the fractional critical Sobolev exponent and V(|y'|,y'') is a bounded non-negative function in R3×RN-3. If r2sV(r,y'') has a stable critical point (r0,y0'') with r0>0 and V(r0,y0'')>0, by using a finite-dimensional reduction method and various local Pohozaev identities, we prove that the problem above has a new type of infinitely many solutions which concentrate at points lying on the top and the bottom of a cylinder. And the concentration points of the bubble solutions include saddle points of the function r2sV(r,y''). We have to overcome some difficulties caused by the non-localness of the fractional Laplacian.