Multiplicity results in the non-coercive case for an elliptic problem with critical growth in the gradient

Abstract

We consider the boundary value problem equation - u = λ c(x)u+ μ(x) |∇ u|2 + h(x), u ∈ H10() L∞(), ≤no(Pλ) equation where ⊂ N, N ≥ 3 is a bounded domain with smooth boundary. It is assumed that c 0, c,h belong to Lp() for some p > N. Also μ ∈ L∞() and μ ≥ μ1 >0 for some μ1 ∈ . It is known that when λ ≤ 0, problem (Pλ) has at most one solution. In this paper we study, under various assumptions, the structure of the set of solutions of (Pλ) assuming that λ>0. Our study unveils the rich structure of this problem. We show, in particular, that what happen for λ=0 influences the set of solutions in all the half-space ]0,+∞[×(H10() L∞()). Most of our results are valid without assuming that h has a sign. If we require h to have a sign, we observe that the set of solutions differs completely for h 0 and h 0. We also show when h has a sign that solutions not having this sign may exists. Some uniqueness results of signed solutions are also derived. The paper ends with a list of open problems.