Large solutions of degenerate and/or singular quasilinear elliptic equations in a ball

Abstract

We consider local weak large solutions with its blow-up rate near the boundary to certain class of degenerate and/or singular quasilinear elliptic equation\\ div(dα(x,∂B)p(∇ u)) = b(x)f(u) in a ball B, where f is normalized regularly varying at infinity with index σ+1>p-1,\ p>1. In particular, how the asymptotic behavior of the solution changes over the varying index and degeneracy and/ or singularity present in the equation. We also include the second order blow-up rate for the corresponding semilinear problem.