Feedback control of a vibrating beam by stiffening action

This paper introduces a vibration control method for a exible beam subjected to arbitrary, unmeasurable disturbance forces. The concept of independent modal space control is adopted. Here, we choose the modal ÿlters as the state estimator to obtain the modal coordinates and modal velocities for the

asymptotic analysis of the system's eigenvalues and eigenfunctions is set up. We Ž . prove that all of the generalized eigenfunctions of 2.9 form a Riesz basis of H H. By a new method, we prove that the operator A A generates a C contraction semigroup 0 Ž . Ž . T t , t G 0. Furthermore T t , t G 0,

The problem of feedback control of vibrations in a micromachined cantilever beam with nonlinear electrostatic actuators is considered. Various forms of nonlinear feedback controls depending on localized spatial averages of the beam velocity and displacement near the beam tip are derived by consideri

The primary resonance of a cantilever beam under state feedback control with a time delay is investigated. By means of the asymptotic perturbation method, two slow-flow equations on the amplitude and phase of the oscillator are obtained and external excitation-response and frequency-response curves