A geometric approach for testing regularity of multi-dimensional polynomial matrices and a pencil of -matrices
F. Acar Savaci, I. Cem Göknar (1991)
Kybernetika
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Displaying similar documents to “On the computation of the minimal polynomial of a polynomial matrix”
A geometric approach for testing regularity of multi-dimensional polynomial matrices and a pencil of -matrices
Discrete-time symmetric polynomial equations with complex coefficients
Didier Henrion, Jan Ježek, Michael Šebek (2002)
Kybernetika
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Discrete-time symmetric polynomial equations with complex coefficients are studied in the scalar and matrix case. New theoretical results are derived and several algorithms are proposed and evaluated. Polynomial reduction algorithms are first described to study theoretical properties of the equations. Sylvester matrix algorithms are then developed to solve numerically the equations. The algorithms are implemented in the Polynomial Toolbox for Matlab.
Algorithms. 38. CHARPOL. Computation of the characteristic polynomial of matrices
Pavla Holasová (1975)
Aplikace matematiky
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An equivalent matrix pencilfor bivariate polynomial matrices
Mohamed Boudellioua (2006)
International Journal of Applied Mathematics and Computer Science
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In this paper, we present a simple algorithm for the reduction of a given bivariate polynomial matrix to a pencil form which is encountered in Fornasini-Marchesini's type of singular systems. It is shown that the resulting matrix pencil is related to the original polynomial matrix by the transformation of zero coprime equivalence. The exact form of both the matrix pencil and the transformation connecting it to the original matrix are established.
Determination of matrices of the desired 2-D characteristic polynomial
T. Kaczorek, M. Świerkosz (1988)
Applicationes Mathematicae
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