Results on entire solutions for a degenerate critical elliptic equation with anisotropic coefficients

Abstract

In this paper, we study the following degenerate critical elliptic equations with anisotropic coefficients -div(|xN|2α∇ u)=K(x)|xN|α· 2*(s)-s|u|2*(s)-2u in RN where x=(x1,...,xN)∈RN, N≥ 3, α>1/2, 0≤ s≤ 2 and 2*(s)=2(N-s)/(N-2). Some basic properties of the degenerate elliptic operator -div(|xN|2α∇ u) are investigated and some regularity, symmetry and uniqueness results for entire solutions of this equation are obtained. We also get some variational identities for solutions of this equation. As a consequence, we obtain some nonexistence results for solutions of this equation.