Affiliation:
1. Centre for Advanced Studies in Pure and Applied Mathematics, Bahauddin Zakariya University, Multan, Pakistan
Abstract
This article aims to provide the equivalent criteria for the
distinguishability of linear descriptor systems (LDS). Regularity of the
matrix pencil, which, loosely speaking, guarantees the existence, and
uniqueness of the solution of LDS for any inhomogeneity, is required in this
article. A characterization of observability for LDS in terms of
distinguishability is given. The Laplace transform together with the
Cayley-Hamilton theorem exploited to derive Hautus-type criteria for the
distinguishability. In addition, we present examples of distinguishable
systems.
Publisher
National Library of Serbia
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