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A transformation for 2-D linear systems and a generalization of a theorem of Rosenbrock - MaRDI portal

A transformation for 2-D linear systems and a generalization of a theorem of Rosenbrock

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Publication:4955068

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DOI10.1080/002071798221795zbMath0987.93010OpenAlexW2044087234MaRDI QIDQ4955068

A. C. Pugh, Mohamed S. Boudellioua, G. E. Hayton, D. S. Johnson, S. J. McInerney

Publication date: 12 June 2000

Published in: International Journal of Control (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1080/002071798221795

zbMATH Keywords

unimodular matrices 2D linear systems zero coprime system equivalence Fuhrmann's strict system equivalence Rosenbrock's least order characterization

Mathematics Subject Classification ID

Multivariable systems, multidimensional control systems (93C35) Transformations (93B17) Algebraic methods (93B25)

Related Items (14)

On the connection between discrete linear repetitive processes and 2-\(D\) discrete linear systems ⋮ Linearization of bivariate polynomial matrices expressed in non monomial basis ⋮ The smith form of a multivariate polynomial matrix over an arbitrary coefficient field ⋮ On the reduction of repetitive processes into singular and non-singular Roesser models ⋮ New remarks on the factorization and equivalence problems for a class of multivariate polynomial matrices ⋮ Equivalent 2-D nonsingular Roesser models for discrete linear repetitive processes ⋮ Control systems analysis for the Fornasini-Marchesini 2D systems model – progress after four decades ⋮ Strict system equivalence of 2D linear discrete state space models ⋮ Equivalence and Reduction of Delay-Differential Systems ⋮ Controllable and observable polynomial description for 2D noncausal systems ⋮ Equivalence of wave linear repetitive processes and the singular \(2-D\) Roesser state-space model ⋮ On the reduction of \(2-D\) polynomial systems into first order equivalent models ⋮ Characterization of a class of spatially interconnected systems (ladder circuits) using two-dimensional systems theory ⋮ On the connections between two classical notions of multidimensional system equivalence

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