Semilinear elliptic degenerate equations with critical exponent

Abstract

In this paper we are mainly concerned with nontrivial positive solutions to the Dirichlet problem for the degenerate elliptic equation gather -∂2 u∂ x2 -|x|2k∂2 u∂ y2=|x|2kup+f(x,y,u) in , \ u=0 on ∂,equ0 gather where is a bounded domain with smooth boundary in R2, \x=0\ , k∈ N, f(x,y,0)=0, and p=(4+5k)/k is the critical exponent. Recently, the equation (1) was investigated in [12] for the subcritical case based on a new result obtained in [17] on embedding theorem of weighted Sobolev spaces. In the critical case considered in this paper we will essentially use the optimal functions and constants found in [17]