Symmetry breaking of extremals for the high order Caffarelli-Kohn-Nirenberg type inequalities

Abstract

In this paper we give the first result about the precise symmetry and symmetry breaking regions of extremal functions for weighted second-order inequalities. Firstly, based on the work of C.-S. Lin [Comm. Partial Differential Equations, 1986], a new second-order Caffarelli-Kohn-Nirenberg type inequality will be established, i.e., equation* ∫RN|x|-β|div (|x|α∇ u)|2 dx ≥ S(∫RN |x|β|u|p*α,β dx)2p*α,β, for all\ u∈ C∞0(RN), equation* for some constant S=S(N,α,β)>0, where align* N≥ 5, α>2-N, α-2<β≤ NN-2α, p*α,β=2(N+β)N-4+2α-β. align* We obtain a symmetry breaking conclusion: when α>0 and βFS(α)<β< NN-2α where βFS(α):= -N+N2+α2+2(N-2)α, then the extremal function for the best constant S, if it exists, is nonradial. Furthermore, we give a symmetry result when β=NN-2α and 2-N<α<0...