论文信息 - Behavior decompositions and two-sided diophantine equations

Behavior decompositions and two-sided diophantine equations

In this paper, the relationship between the decomposition of (linear, time-invariant, differential) behaviors and the solvability of certain two-sided diophantine equations is explored. The possibility of expressing a behavior as the sum of two sub-behaviors, endowed with a finite dimensional (and hence autonomous) intersection, one of which is a priori chosen, proves to be related to the solvability of a particular two-sided diophantine equation. In particular, the existence of a direct sum decomposition is equivalent to the solvability of a two-sided Bezout equation, and hence to the internal skew-primeness of a suitable matrix pair.

Maria Elena Valcher | Mauro Bisiacco | M. Bisiacco | M. E. Valcher

[1] A. B. Özgüler,et al. Skew-prime polynomial matrices: The polynomial-model approach , 1983 .

[2] P. J. Davis,et al. Introduction to functional analysis , 1958 .

[3] Frank M. Callier. Book review: J. W. Polderman and J.C. Willems, "Introduction to Mathematical Systems Theory: a Behavioral Approach" (Springer Verlag 1998) , 2002 .

[4] Maria Paula Macedo Rocha. Structure and representation of 2-D systems , 1990 .

[5] Jan C. Willems,et al. Introduction to mathematical systems theory: a behavioral approach, Texts in Applied Mathematics 26 , 1999 .

[6] Thomas Kailath,et al. Linear Systems , 1980 .

[7] R. Curtain,et al. Functional Analysis in Modern Applied Mathematics , 1977 .

[8] Jr. G. Forney,et al. Minimal Bases of Rational Vector Spaces, with Applications to Multivariable Linear Systems , 1975 .

[9] William A. Wolovich,et al. Skew prime polynomial matrices , 1978 .

[10] J. Partington,et al. Introduction to functional analysis , 1959 .