A blow-up approach for singular elliptic problems with natural growth in the gradient

Abstract

We prove existence and nonexistence results concerning elliptic problems whose basic model is equation* cases - u+μ(x)|∇ u|2(u+δ)γ= λ up, &x∈ , \\ u> 0, &x∈ , \\ u=0, &x∈∂, cases equation* where ⊂RN (N≥ 3) is a bounded smooth domain, λ>0, p>1, δ≥ 0, γ>0 and μ∈ L∞(). The main achievement resides in handling a possibly singular (δ=0) first order term having a nonconstant coefficient μ in the presence of a superlinear zero order term. Our approach for the existence results is based on fixed point theory. With the aim of applying it, a previous analysis on a related non-homogeneous problem is carried out. The required a priori estimates are proven via a blow-up method.