Finite energy solutions for nonlinear elliptic equations with competing gradient, singular and L1 terms

Abstract

In this paper we deal with the following boundary value problem equation* cases -pu + g(u) | ∇ u|p = h(u)f & in , u≥ 0 & in , u=0 & on ∂ , \ cases equation* in a domain ⊂ RN (N ≥ 2), where 1≤ p<N , g is a positive and continuous function on [0,∞), and h is a continuous function on [0,∞) (possibly blowing up at the origin). We show how the presence of regularizing terms h and g allows to prove existence of finite energy solutions for nonnegative data f only belonging to L1().