Regularizing effect of the natural growth term in quasilinear problems with sign-changing nonlinearities

Abstract

We investigate the existence and nonexistence of solutions to the Dirichlet problem equation* P pba \ alignedat2 -Δp u + g(u) |∇ u|p &= λf(u) &&in \;\; Ω, \\ u &= 0 &&on \;\; ∂Ω, alignedat . equation* where Ω⊂ RN is a smooth bounded domain, p∈ (1,∞), λ>0 and g∈ C(R). Our main assumption is that :f R R is a continuous function such that f(s)>0 for all s∈ (α,β), where 0<α<β are two zeros of f. If f(0)≥ 0, we show that an area condition involving f and g is both sufficient and necessary in order to have a pair (λ,u)∈ R+× C01(Ω), with u≥ 0 and \|u\|C(Ω)∈ (α,β], solving~pba. We also study how the presence of the gradient term affects the existence of solution. Roughly speaking, the more negative g is, the stronger its regularizing effect on~pba. We prove that, regardless of the shape of f, for any fixed λ, there always exists a function g such that~pba admits a nonnegative solution with maximum in (α,β].