Asymptotic behavior of positive solutions to a degenerate elliptic equation in the upper half space with a nonlinear boundary condition

Abstract

We consider positive solutions of the problem equation \arrayl-div(xna∇ u)=0 in\;\;R+n,\\ ∂ u∂ a=uq on\;\;∂ R+n,\\ array . equation where a∈ (-1,0)(0,1), q>1 and ∂ u∂ a:=-xn→ 0+xna∂ u∂ xn. We obtain some qualitative properties of positive axially symmetric solutions in n≥3 for the case a∈ (-1,0) under the condition q≥n-an+a-2. In particular, we establish the asymptotic expansion of positive axially symmetric solutions.