On semilinear elliptic equation with negative exponent arising from a closed MEMS model

Abstract

This paper is concerned with the elliptic equation - u=λ (a-u)p in a connected, bounded C2 domain of RN subject to zero Dirichlet boundary conditions, where λ>0, N≥ 1, p>0 and a:[0,1] vanishes at the boundary with the rate dist(x,∂)γ for γ>0. When p=2 and N=2, this equation models the closed Micro-Electromechanical Systems devices, where the elastic membrane sticks the curved ground plate on the boundary, but insulating on the boundary. The function a shapes the curved ground plate. Our aim in this paper is to study qualitative properties of minimal solutions of this equation when λ>0, p>0 and to show how the boundary decaying of a works on the minimal solutions and the pull-in voltage. Particularly, we give a complete analysis for the stability of the minimal solutions.

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