The minimum dimensions of the control vector in the linear dynamic problem of stabilization

## Communicated by B. Brosowski In this paper we consider the problem of stabilizing the motion of the tip of a thin rod by controlling the shape of the rod, that is its length, dynamically. Well-posedness of the associated state equations, valid on a moving domain, is proved, and the necessary co

## Abstract A novel integral equation technique is employed for the analysis of dynamic stability problems. The governing equation of the linearized parametric resonance problem is transformed into an integral equation. The kernel of the integral equation is computed as the influence function for t

We present methods for establishing the full non-linear stabilty of solutions of lattice dynamical systems. We apply these results to establish the existence of a "chaos-order" phase transition in a particular coupled map lattice model for which space time chaos in the small coupling regime had been