Regularity of the extremal solution in a MEMS model with advection

Abstract

We consider the regularity of the extremal solution of the nonlinear eigenvalue problem (S)λ rcr - u + c(x) · ∇ u &=& λ(1-u)2 in , u &=& 0 on , where is a smooth bounded domain in N and c(x) is a smooth bounded vector field on . We show that, just like in the advection-free model (c 0), all semi-stable solutions are smooth if (and only if) the dimension N≤ 7. The novelty here comes from the lack of a suitable variational characterization for the semi-stability assumption. We overcome this difficulty by using a general version of Hardy's inequality. In a forthcoming paper CG2, we indicate how this method applies to many other nonlinear eigenvalue problems involving advection (including the Gelfand problem), showing that they all essentially have the same critical dimension as their advection-free counterparts.