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A fundamental notion of equivalence for linear
multivariable systems
Των A. C.
Pugh (Dept. of Math. Sci., Loughborough Univ. of Technol., Leics., UK), N. P.
Karampetakis, A. I. G. Vardulakis, G. E. Hayton
A fundamental form of equivalence between polynomial
matrix descriptions of linear multivariable systems is defined. It is based on
the existence of a bijective map between the finite and the infinite solution
sets of the differential equations describing the two systems. The connection
with the system matrix relationship of full system equivalence is established.
It is concluded that the transformation of full system equivalence, with its
various characterizations, is the basic transformational tool for the
simultaneous study of the finite and infinite frequency behavior of general
linear multivariable systems.
Για περισσότερα
ΕΔΩ.
ΛΕΞΕΙΣ-ΚΛΕΙΔΙΑ: ΜΑΘΗΜΑΤΙΚΑ, ΙΣΟΔΥΝΑΜΙΑ, ΓΡΑΜΜΙΚΑ ΣΥΣΤΗΜΑΤΑ, ΠΟΛΛΑΠΛΕΣ ΜΕΤΑΒΛΗΤΕΣ, ΚΑΡΑΜΠΕΤΑΚΗΣ, ΒΑΡΔΟΥΛΑΚΗΣ
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