On the Bistritz tabular form and its relationship with the Schur-Cohn minors and inner determinants
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[1] E. I. Jury,et al. Theory and application of the z-transform method , 1965 .
[2] B. Anderson,et al. A simplified Schur-Cohn test , 1973 .
[3] E. Jury,et al. Application of polynomial array method to discrete-time system stability , 1993 .
[4] Yuval Bistritz,et al. A circular stability test for general polynomials , 1986 .
[5] Y. Bistritz. Zero location with respect to the unit circle of discrete-time linear system polynomials , 1984 .
[6] E. I. Jury,et al. On two-dimensional filter stability test , 1994 .
[7] Thomas Kailath,et al. Generalized Bezoutians and families of efficient zero-location procedures , 1991 .
[8] V. V. Krishnan,et al. Inners and Stability of Dynamic Systems , 1975, IEEE Transactions on Systems, Man, and Cybernetics.
[9] E. Jury. A note on the modified stability table for linear discrete time systems , 1991 .
[10] Brian D. O. Anderson,et al. A note on the reduced Schur-Cohn criterion , 1981 .
[11] X. Hu,et al. 2-D filter stability tests using polynomial array for F(z/sub 1/,z/sub 2/) on mod z/sub 1/ mod =1 , 1991 .
[12] E. I. Jury,et al. Modified stability table for 2-D digital filters , 1988 .
[13] E. I. Jury,et al. A modified stability table for linear discrete systems , 1965 .