Title :
Matching zeros: a fixed constraint in multivariable synthesis
Author :
Sain, Michael K. ; Wyman, Bostwick F. ; Peczkowski, Joseph L.
Author_Institution :
Dept. of Electr. & Comput. Eng., Notre Dame Univ., IN, USA
Abstract :
The model-matching equation (Tz)=P( z)M(z) induces constraints on the multivariate zero structures of P(z) and M( z), and the nature of the constraint is best explained by extending the usual notion of zero. In particular, the extended Γ-zero module of P(z) must contain as a submodule the module ZΓ of matching Γ-zeros, which depends only on T(z) and M (z), and the extended Ω-zero module of M( z) must contain as a factor module the module ZΩ of matching Ω-zeros, which depends only on T(z) and P(z). Essential solutions, in which the constraint is by module isomorphism, are possible if and only if the nullity of P(z) does not exceed the nullity of T(z), on the one hand, or the conullity of M(z) does not exceed the conullity of T(z), on the other
Keywords :
control system synthesis; multivariable control systems; poles and zeros; conullity; extended Γ-zero module; extended Ω-zero module; matching Γ-zeros; matching Ω-zeros; model-matching; module isomorphism; multivariable control system synthesis; multivariate zero structures; nullity; Aerospace control; Control engineering computing; Equations; Feedback; Mathematics; Poles and zeros; Polynomials; Power engineering and energy; Transfer functions; Vectors;
Conference_Titel :
Decision and Control, 1988., Proceedings of the 27th IEEE Conference on
Conference_Location :
Austin, TX
DOI :
10.1109/CDC.1988.194696
