The main purpose of this work is to propose new notions of equivalence between polynomial matrices that preserve both the finite and infinite elementary divisor structures. The approach we use is twofold: (a) the 'homogeneous polynomial matrix approach', where in place of the polynomial matrices we study their homogeneous polynomial matrix forms and use 2-D equivalence transformations in order to preserve their elementary divisor structure, and (b) the 'polynomial matrix approach', where some conditions between the 1-D polynomial matrices and their transforming matrices are proposed.
@article{bwmeta1.element.bwnjournal-article-amcv13i4p493bwm, author = {Karampetakis, Nicholas and Vologiannidis, Stavros}, title = {Infinite elementary divisor structure-preserving transformations for polynomial matrices}, journal = {International Journal of Applied Mathematics and Computer Science}, volume = {13}, year = {2003}, pages = {493-503}, zbl = {1115.93019}, language = {en}, url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-amcv13i4p493bwm} }
Karampetakis, Nicholas; Vologiannidis, Stavros. Infinite elementary divisor structure-preserving transformations for polynomial matrices. International Journal of Applied Mathematics and Computer Science, Tome 13 (2003) pp. 493-503. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-amcv13i4p493bwm/
[000] Antoniou E. and Vardulakis A. (2003): Fundamental equivalence of discrete-time AR-representations. - Int. J. Contr., Vol. 76, No. 11, pp. 1078-1088. | Zbl 1066.93011
[001] Antoniou E.N., Vardulakis A.I.G. and Karampetakis N.P. (1998): A spectral characterization of the behavior of discrete time AR-representations over a finite time interval. - Kybernetika, Vol. 34, No. 5, pp. 555-564. | Zbl 1274.93174
[002] Gantmacher F. (1959): The Theory of Matrices. -New York: Chelsea Pub.Co. | Zbl 0085.01001
[003] Gohberg I., Lancaster P. and Rodman L. (1982): Matrix Polynomials. -New York: Academic Press. | Zbl 0482.15001
[004] Hayton G.E., Pugh A.C. and Fretwell P. (1988): Infinite elementary divisors of a matrix polynomial and implications. - Int. J. Contr., Vol. 47, No. 1, pp. 53-64. | Zbl 0661.93016
[005] Johnson D. (1993): Coprimeness in multidimensional system theory and symbolic computation. -Ph.D. thesis, Loughborough University of Technology, U.K.
[006] Karampetakis N. (2002a): On the determination of the dimension of the solution space of discrete time AR-representations. - Proc. 15th IFAC World Congress, Barcelona, Spain, (CD-ROM).
[007] Karampetakis N. (2002b): On the construction of the forward and backward solution space of a discrete time AR-representation. - Proc. 15th IFAC World Congress, Barcelona, Spain, (CD-ROM).
[008] Karampetakis N.P., Pugh A.C. and Vardulakis A.I. (1994): Equivalence transformations of rational matrices and applications. - Int. J. Contr., Vol. 59, No. 4, pp. 1001-1020. | Zbl 0813.93021
[009] Karampetakis N.P., Vologiannidis S. and Vardulakis A. (2002): Notions of equivalence for discrete time AR-representations. - Proc. 15th IFAC World Congress, Barcelona, Spain, (CD-ROM). | Zbl 1059.93027
[010] Levy B. (1981): 2-D polynomial and rational matrices and their applications for the modelling of 2-D dynamical systems. -Ph.D. thesis, Stanford University, U.S.A.
[011] Praagman C. (1991): Invariants of polynomial matrices. - Proc. 1st European Control Conf., Grenoble, France, pp. 1274-1277,
[012] Pugh A.C. and El-Nabrawy E.M.O. (2003): Zero Structures of N-D Systems. - Proc. 11th IEEE Mediterranean Conf. Control and Automation, Rhodes, Greece, (CD-ROM). | Zbl 1213.93070
[013] Pugh A.C. and Shelton A.K. (1978): On a new definition of strict system equivalence. - Int. J. Contr., Vol. 27, No. 5, pp. 657-672. | Zbl 0393.93010
[014] Vardulakis A. (1991): Linear Multivariable Control: Algebraic Analysis, and Synthesis Methods. - Chichester: Willey. | Zbl 0751.93002
[015] Vardulakis A. and Antoniou E. (2001): Fundamental equivalence of discrete time ar representations. - Proc. 1st IFAC Symp. System Structure and Control, Prague, Czech Republic, (CD-ROM). | Zbl 1066.93011