Computing Dominant Poles of Power System Multivariable Transfer Functions

This paper is concerned with the computation of transfer function matrices of linear multivariable systems described by their state-space equations. The algorithm proposed here performs orthogonal similarity transformations to find the minimal order subsystem corresponding to each input-output pair

Here we give a mathematical proof that a current method that calculates dominant poles is locally convergent. Moreover, the convergence is at least quadratic.

Rational interpolants with prescribed poles are used to approximate holomorphic functions on the closure of their region of analyticity under natural assumptions of their properties on the boundary. The transfer functions of some infinite dimensional dynamical systems of interest in applications sat

For singular systems, i.e. for systems of the form Ek = Ax + Bu, with E singular, the problem of computing the transfer function matrix has been studied. An algorithm is developed which is similar to the corresponding algorithm proposed by Faddeev or Leverrierfor regular Systems. The present results