The critical dimension for a fourth order elliptic problem with singular nonlinearity

Abstract

We study the regularity of the extremal solution of the semilinear biharmonic equation u=λ(1-u)2, which models a simple Micro-Electromechanical System (MEMS) device on a ball B⊂N, under Dirichlet boundary conditions u=∂ u=0 on ∂ B. We complete here the results of F.H. Lin and Y.S. Yang LY regarding the identification of a "pull-in voltage" *>0 such that a stable classical solution u with 0<u<1 exists for ∈ (0,*), while there is none of any kind when >*. Our main result asserts that the extremal solution uλ* is regular (B uλ* <1) provided N 8 while uλ* is singular (B uλ* =1) for N 17, in which case 1-C0|x|4/3≤ uλ* (x) ≤ 1-|x|4/3 on the unit ball, where C0:= <(λ*λ>)1/3 and λ:= 8 (N-2/3) (N- 8/3)9. The singular character of the extremal solution for the remaining cases (i.e., when 9≤ N≤ 16) requires a computer assisted proof and will not be addressed in this paper.