Existence and Multiplicity for elliptic p-Laplacian problems with critical growth in the gradient

Abstract

We consider the boundary value problem -p u = λ c(x) |u|p-2u + μ(x) | u|p + h(x), u ∈ W1,p0() L∞(), where ⊂ RN, N ≥ 2, is a bounded domain with smooth boundary. We assume c, h ∈ Lq() for some q > \N/p,1\ with c 0 and μ ∈ L∞(). We prove existence and uniqueness results in the coercive case λ ≤ 0 and existence and multiplicity results in the non-coercive case λ >0. Also, considering stronger assumptions on the coefficients, we clarify the structure of the set of solutions in the non-coercive case.