Classification and non-degeneracy of positive radial solutions for a weighted fourth-order equation and its application

Abstract

This paper is devoted to radial solutions of the following weighted fourth-order equation equation* div(|x|α∇(div(|x|α∇ u)))=u2**α-1, u>0 in RN, equation* where N≥ 2, 4-N2<α<2 and 2**α=2NN-4+2α. It is obvious that the solutions of above equation are invariant under the scaling λN-4+2α2u(λ x) while they are not invariant under translation when α≠ 0. We characterize all the solutions to the related linearized problem about radial solutions, and obtain the conclusion of that if α satisfies (2-α)(2N-2+α)≠4k(N-2+k) for all k∈N+ the radial solution is non-degenerate, otherwise there exist new solutions to the linearized problem that ``replace'' the ones due to the translations invariance. As applications, firstly we investigate the remainder terms of some inequalities related to above equation. Then when N≥ 5 and 0<α<2, we establish a new type second-order Caffarelli-Kohn-Nirenberg inequality equation* ∫RN |div(|x|α∇ u)|2 dx ≥ C (∫RN|u|2**α dx)22**α, for all u∈ C∞0(RN), equation* and in this case we consider a prescribed perturbation problem by using Lyapunov-Schmidt reduction.