Existence, uniqueness and qualitative properties of positive solutions of quasilinear elliptic equations

Abstract

We study the following quasilinear elliptic equation -p u + (β(x)-a(x)) up-1 + b(x)g(u)=0 in RN (Pβ) where p>1, ∈ L∞loc(RN), a,b ∈ L∞(RN), β,b,g ≥ 0. We provide a sharp criterion in terms of generalized principal eigenvalue for existence/nonexistence of positive solutions of (Pβ) in suitable classes of functions. We derive the uniqueness result of (Pβ) in those classes. Under additional conditions on , we further show that : i) either for every β ≥ 0 nonexistence phenomenon occurs, ii) or there exists a threshold value β*>0 in the sense that for every β ∈ [0,β*) existence and uniqueness phenomenon occurs and for every β ≥ β* nonexistence phenomenon occurs. In the latter case, we study the limits, as β 0 and ββ*, of the sequence of positive solutions of (Pβ). Our results are new even in the case p=2.