Infinitely many sign-changing solutions for an elliptic problem with double critical Hardy-Sobolev-Maz'ya terms

Abstract

In this paper, we investigate the following elliptic problem involving double critical Hardy-Sobolev-Maz'ya terms: \arrayll - u = μ|u|2*(t)-2u|y|t + |u|2*(s)-2u|y|s + a(x) u, & in\ ,\\ u = 0, \,\, & on\ ∂ , array . where μ≥0, a(x)>0, 2*(t)=2(N-t)N-2, 2*(s) = 2(N-s)N-2, 0≤ t<s<2, x = (y,z)∈ Rk× RN-k, 2≤ k<N, (0,z*) ∈ and is an bounded domain in RN. Applying an abstract theorem in sz, we prove that if N>6+t when μ>0, and N>6+s when μ=0, and satisfies some geometric conditions, then the above problem has infinitely many sign-changing solutions. The main tool is to estimate Morse indices of these nodal solution.