Existence of radial solution for a quasilinear equation with singular nonlinearity

Abstract

We prove that the equation eqnarray* -p u =λ( 1 uδ + uq + f(u))\; in \, BR(0) u =0 \, on \; ∂ BR(0), u>0 in \, BR(0) eqnarray* admits a weak radially symmetric solution for λ>0 sufficiently small, 0<δ<1 and p-1<q<p*-1. We achieve this by combining a blow-up argument and a Liouville type theorem to obtain a priori estimates for the regularized problem. Using a variant of a theorem due to Rabinowitz we derive the solution for the regularized problem and then pass to the limit.