A priori estimates and multiplicity for systems of elliptic PDE with natural gradient growth

Abstract

We consider fully nonlinear uniformly elliptic cooperative systems with quadratic growth in the gradient, such as -Fi(x, ui, Dui, D2 ui)- Mi(x)D ui, D ui =λ ci1(x) u1 + ·s + λ cin(x) un +hi(x), for i=1,·s,n, in a bounded C1,1 domain ⊂ RN with Dirichlet boundary conditions; here n≥ 1, λ ∈R, cij,\, hi ∈ L∞(), cij≥ 0, Mi satisfies 0<μ1 I≤ Mi≤ μ2 I, and Fi is an uniformly elliptic Isaacs operator. We obtain uniform a priori bounds for systems, under a weak coupling hypothesis that seems to be optimal. As an application, we also establish existence and multiplicity results for these systems, including a branch of solutions which is new even in the scalar case.