English

Linearizations for Rosenbrock system polynomials and rational matrix functions

Numerical Analysis 2015-05-15 v1

Abstract

Our aim in this paper is two-fold: First, for computing zeros of a linear time-invariant (LTI) system Σ\Sigma in {\em state-space form}, we introduce a "trimmed structured linearization", which we refer to as {\em Rosenbrock linearization}, of the Rosenbrock system polynomial S(\lam)\mathcal{S}(\lam) associated with Σ.\Sigma. We also introduce Fiedler-like matrices for S(\lam)\mathcal{S}(\lam) and describe constructions of Fiedler-like pencils for S(\lam).\mathcal{S}(\lam). We show that the Fiedler-like pencils of S(\lam)\mathcal{S}(\lam) are Rosenbrock linearizations of the system polynomial S(\lam).\mathcal{S}(\lam). Second, with a view to developing a direct method for solving rational eigenproblems, we introduce "linearization" of a rational matrix function. We describe a state-space framework for converting a rational matrix function G(\lam)G(\lam) to an "equivalent" matrix pencil L(\lam)\mathbb{L}(\lam) of smallest dimension such that G(\lam)G(\lam) and L(\lam)\mathbb{L}(\lam) have the same "eigenstructure" and we refer to such a pencil L(\lam)\mathbb{L}(\lam) as a "linearization" of G(\lam).G(\lam). Indeed, by treating G(\lam)G(\lam) as the transfer function of an LTI system ΣG\Sigma_G in state-space form via state-space realization, we show that the Fiedler-like pencils of the Rosenbrock system polynomial associated with ΣG\Sigma_G are "linearizations" of G(\lam)G(\lam) when the system ΣG\Sigma_G is both controllable and observable.

Keywords

Cite

@article{arxiv.1505.03636,
  title  = {Linearizations for Rosenbrock system polynomials and rational matrix functions},
  author = {Rafikul Alam and Namita Behera},
  journal= {arXiv preprint arXiv:1505.03636},
  year   = {2015}
}

Comments

28 pages

R2 v1 2026-06-22T09:34:02.121Z