Free vibrations in a wave equation modeling MEMS

Abstract

We study a nonlinear wave equation appearing as a model for a membrane (without viscous effects) under the presence of an electrostatic potential with strength λ. The membrane has a unique stable branch of steady states uλ for λ∈0,λ]. We prove that the branch uλ has an infinite number of branches of periodic solutions (free vibrations) bifurcating when the parameter λ is varied. Furthermore, using a functional setting, we compute numerically the branch uλ and their branches of periodic solutions. This approach is useful to validate rigorously the steady states uλ at the critical value λ.