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Zampieri, Sandro
Exact modelling of scalar 2D arrays. (English). Kybernetika, vol. 30 (1994), issue 2, pp. 129-140
MSC: 93A10, 93A30, 93B25, 93B30 | MR 1283490 | Zbl 0814.93009
References:
[1] R. E. Kalman: On partial realizations, transfer functions and canonical forms. Acta Polytech. Scand. Math. Comput. Sci. Ser. 31 (1978), 9-32. MR 0557691
[2] J. C. Willems: Models for dynamics. Dynamics reported 2 (1988), 171-269. MR 1000978
[3] C. Heij: Exact modelling and identifiability of linear systems. Automatica 28 (1992), 325-344. MR 1157004 | Zbl 0766.93003
[4] S. Sakata: Finding a minimal set of linear recurring relations capable of generating a given two-dimensional array. J. Symbolic Computat. 5 (1988), 321-337. MR 0946587
[5] S. Sakata: A Gröbner basis and a minimal polynomial set of a finite $nd$ array. (Lecture Notes in Computer Science 508, S. Sakata, ed.), Springer, Berlin 1990, pp. 280-291. MR 1123958
[6] P. Rocha: Structure and Representation of 2-D Systems. PhD Dissertation, University of Groningen, 1990.
[7] P. Rocha, J. C. Willems: Canonical computational forms for AR 2-D systems. Multidimensional Systems and Signal Processing 2 (1990), 251-278.
[8] B. Buchberger: Gröbner basis: An algorithmic method in polynomial ideal theory. In: Multidimensional Systems Theory (N. K. Bose, ed.), D. Reidel, 1985, pp. 184-232.
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