Electrostatic Circular Membrane MEMS: An Approach to the Optimal Control

• Main Authors: Mario Versaci, Francesco Carlo Morabito
• Format: Article
• Language: English
• Published: MDPI AG 2021-03-01
• Series: Computation
• Subjects: circular MEMS device; electrostatic actuator; boundary semi-linear elliptic equations; optimal control
• Online Access: https://www.mdpi.com/2079-3197/9/4/41

The recovery of the membrane profile of an electrostatic micro-electro-mechanical system (MEMS) is an important issue, because, when an external electrical voltage is applied, the membrane deforms with the risk of touching the upper plate of the device producing an unwanted electrostatic effect. Therefore, it is important to know whether the movement admits stable equilibrium configurations especially when the membrane is closed to the upper plate. In this framework, this work analyzes the behavior of a two-dimensional (2D) electrostatic circular membrane MEMS device subjected to an external voltage. Specifically, starting from a well-known 2D non-linear second-order differential model in which the electrostatic field in the device is proportional to the mean curvature of the membrane, the stability of the only possible equilibrium configuration is studied. Furthermore, when considering that the membrane is equipped with mechanical inertia and that it must not touch the upper plate of the device, a useful range of possible values has been obtained for the applied voltage. Finally, the paper concludes with some computations regarding the variation of potential energy, identifying some optimal control conditions.