On a class of weighted p-Laplace equation with singular nonlinearity

Abstract

This article deals with the existence of the following quasilinear degenerate singular elliptic equation equation* (P)\ split -div(w(x)|∇ u|p-2∇ u) &= g(u),\;u>0\; in\; , u&=0 \; on\; ∂ , split. equation* where ⊂ Rn is a smooth bounded domain, n≥ 3, >0, p>1 and w is a Muckenhoupt weight. Using variational techniques, for g(u)= f(u)u-q and certain assumptions on f, we show existence of a solution to (P) for each >0. Moreover when g(u)= u-q+ ur we establish existence of atleast two solutions to (P) in a suitable range of the parameter . Here we assume q∈ (0,1) and r ∈ (p-1,p*s-1).