Infinitely many bubbling solutions and non-degeneracy results to fractional prescribed curvature problems
Abstract
We consider the following fractional prescribed curvature problem (-)s u= K(y)u2*s-1,\ \ u>0,\ \ y∈ RN, (0.1) where s∈(0,12) for N=3, s∈(0,1) for N≥slant4 and 2*s=2NN-2s is the fractional critical Sobolev exponent, K(y) has a local maximum point in r∈(r0-δ,r0+δ). First, for any sufficient large k, we construct a 2k bubbling solution to (0.1) of some new type, which concentrate on an upper and lower surfaces of an oblate cylinder through the Lyapunov-Schmidt reduction method. Furthermore, a non-degeneracy result of the multi-bubbling solutions is proved by use of various Pohozaev identities, which is new in the study of the fractional problems.
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