Stability boundaries for parametrically excited systems by dynamic stiffness

In this paper a variational formulation of optimization problems for mechanical elements like bars or plates, subjected to a parametric excitation force, periodic in time is given. Objective functions characterizing the parametric resonance are introduced. The paper deals with the problem of "nding

A boundary tracing method is presented for the construction of stability charts for non-canonical parametrically excited systems. The method is an extension, so as to cover the combination resonances, of the well known Bolotin's method, and reduces the boundary tracing problem into an eigenvalue ana

We propose in this paper a constructive time-varying adaptive control scheme for a new class of linearly parametrized non-linear systems. The considered systems are not stabilizable by continuous time-invariant state feedback for any value of the parameters. The novelty of the proposed method is a c

In this work we show that the now standard lumped non-linear enhancement of root-locus design still persists for a non-linear distributed parameter boundary control system governed by a scalar viscous Burgers' equation. Namely, we construct a proportional error boundary feedback control law and show