A priori bounds and a Liouville theorem on a half-space for 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 in RN with Dirichlet boundary conditions. The operator L is a uniformly elliptic operator of order 2m. We assume that for s ∞ the nonlinearity f(x,s) behaves like |s|q multiplied by a continuous and positive function of x. Here the exponent q is subcritical, i.e., q>1 if N<=2m, 1<q<N+2mN-2m if N>2m. We prove a priori bounds, i.e, we show that the L∞-norm of every solution u is bounded by a constant independent of u. The solutions are allowed to be sign-changing. The proof is done by a blow-up argument which relies on the following new Liouville-type theorem on a half-space: if u is a classical, bounded, non-negative solution of (-)m u = uq in a half-space with Dirichlet boundary conditions and if q>1 is subcritical then u vanishes identically.