论文信息 - On the stability of two-dimensional state-space systems: A special case

On the stability of two-dimensional state-space systems: A special case

The stability of two-dimensional state-space systems can be determined by knowing the zero manifolds of the characteristic equation \det(I- z_{1}A_{1} - z_{2}A_{2}) = 0 or, equivalently, the eigenvalues of the matrix (A_{1} + e^{J\omega}A_{2}) for all real ω. We propose a new simple test for the special case when the matrices A 1 and A 2 are simultaneously reducible to upper (or lower) triangular form. This test can also be used to simplify the general problem if these matrices are partially reducible to the triangular form.

H. Nicholson | K. Fernando

[1] Ettore Fornasini,et al. On the Problems of Constructing Minimal Realizations for Two-Dimensional Filters , 1980, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[2] Eduardo D. Sontag,et al. On first-order equations for multidimensional filters , 1978 .

[3] Thomas S. Huang,et al. Stability of two-dimensional recursive filters , 1972 .

[4] Ettore Fornasini,et al. On the relevance of noncommutative power series in spatial filters realization , 1978 .

[5] G. Marchesini,et al. Stability analysis of 2-D systems , 1980 .