THE EXISTENCE OF SOLUTIONS OF LINEAR MULTIVARIABLE SYSTEMS IN DESCRIPTOR FROM FORM

  • AASARAAI, A. (Dept. of Mathematics, Guilan University)
  • Received : 2002.01.22
  • Published : 2002.07.30

Abstract

The solutions of a homogeneous system in state space form $\dot{x}=Ax$ are to the form $x=e^{At}x_0$ and the solutions of an inhomogeneous system $\dot{x}=Ax(t)+f(t)$ are to the form $x=e^{At}x_0+{{\int}_0^t}\;e^{A(t-{\tau})}f({\tau})d{\tau}$. In this note we show that the solution of descriptor systems under some conditions exists, and is unique, moreover it is interesting to know the solutions of descriptor system are schematically like the solutions as in the state space form. Also we will give some algorithms to compute these solutions.

Keywords

descriptor systems;invariant subspaces

References

  1. SIAM J. CONTROL AND OPTIMIZATION v.27 no.6 Ondisturbance decoupling in descriptor systems Fletcher, L.R.;Aasaraai, A.
  2. Linear Multivariable Control a Geometric Approach Wonham, W.M.