论文信息 - The lattice of minimal realizations of response maps over rings

The lattice of minimal realizations of response maps over rings

A lattice characterization is given for the class of minimal-rank realizations of a linear response map defined over a (commutative) Noetherian integral domain. As a corollary, it is proved that there are only finitely many nonisomorphic minimal-rank realizations of a response map over the integers, while for delay-differential systems these are classified by a lattice of subspaces of a finite-dimensional real vector space.

Eduardo D. Sontag

[1] Edward W. Kamen,et al. On an algebraic theory of systems defined by convolution operators , 1975, Mathematical systems theory.

[2] R E Kalman,et al. Algebraic Structure of Linear Dynamical Systems. III. Realization Theory Over a Commutative Ring. , 1972, Proceedings of the National Academy of Sciences of the United States of America.

[3] Eduardo Sontag. Linear Systems over Commutative Rings. A Survey , 1976 .

[4] Edward W. Kamen,et al. An operator theory of linear functional differential equations , 1978 .

[5] W. Wonham,et al. Topics in mathematical system theory , 1972, IEEE Transactions on Automatic Control.

[6] Bostwick F. Wyman,et al. Linear Dynamical Systems over Integral Domains , 1974, J. Comput. Syst. Sci..

[7] Eduardo D. Sontag. On Split Realizations of Response Maps over Rings , 1978, Inf. Control..