Hurwitz Matrix for Polynomial Matrices
نویسنده
چکیده
If a system is given by its transfer function then the stability of the system is determined hy the denominator polynomial and its corresponding Hurwitz matrix 7-{. Also the critical stability conditions are determined by its determinant det 7-{. The aim of this paper is to get a generalized Hurwitz matrix for polynomial matrices. In order to achieve that, we first obtain a relation between the Hurwiz matrix for a polynomial and the Lyapunov equation. Here we show how the Hurwitz matrix appears in the solution of the Lyapunov equation using the companion matrix realization and the Kronecker formulation of Lyapunov equation. Using this result we show how the generalized Hurwitz matrix for polynomial matrices can be constructed.
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