A priori bounds for energy-bounded solutions of critical polyharmonic equations

Abstract

We investigate critical polyharmonic equations of the following type: Lu = |u|2-2 u in Ω with Dirichlet boundary conditions, in a smooth bounded domain Ω of Rn. Here L is an elliptic differential operator of even integer order 2 2k < n whose leading order term is (-Δ)k and 2 = 2nn-2k is the critical Sobolev exponent. Our main result establishes, in large dimensions, uniform a priori bounds on bounded-energy solutions of this problem under a coercivity assumption of sorts on the lower-order terms of L. Our results are sharp, at least when k=1. Our approach uses asymptotic analysis techniques and in the course of the proof we obtain in particular a new global pointwise description of bounded-energy blowing-up solutions for this problem, which is of independent interest.