Existence of solutions to nonlinear, subcritical higher-order elliptic Dirichlet problems

Abstract

We consider the 2m-th order elliptic boundary value problem Lu=f(x,u) on a bounded smooth domain ⊂N with Dirichlet boundary conditions on ∂. The operator L is a uniformly elliptic linear operator of order 2m whose principle part is of the form (-Σi,j=1N aij(x) ∂2∂ xi∂ xj)m. We assume that f is superlinear at the origin and satisfies s∞f(x,s)sq=h(x), s-∞f(x,s)|s|q=k(x), where h,k∈ C() are positive functions and q>1 is subcritical. By combining degree theory with new and recently established a priori estimates, we prove the existence of a nontrivial solution.