Symmetry and stability of non-negative solutions to degenerate elliptic equations in a ball

Abstract

We consider non-negative distributional solutions u∈ C1 (BR ) to the equation -div [g(|∇ u|)|∇ u|-1 ∇ u ] = f(|x|,u) in a ball BR, with u=0 on ∂ BR , where f is continuous and non-increasing in the first variable and g∈ C1 (0,+∞ ) C[0, +∞ ), with g(0)=0 and g'(t)>0 for t>0. According to a result of the first author, the solutions satisfy a certain 'local' type of symmetry. Using this, we first prove that the solutions are radially symmetric provided that f satisfies appropriate growth conditions near its zeros. In a second part we study the autonomous case, f=f(u). The solutions of the equation are critical points for an associated variation problem. We show under rather mild conditions that global and local minimizers of the variational problem are radial.