Abstract
The skew-primeness of square, nonsingular polynomial matrices is shown to be directly connected to the decomposition of a vector space relative to an endomorphism. Generalization of this result to the case of rectangular polynomial matrices reveals a clear connection between the conditions for the solvabilility of the problem of output regulation with internal stability, obtained through the geometric (state-space) approach, and the polynomial matrix approach to linear system theory.
Original language | English (US) |
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Pages | 139-143 |
Number of pages | 5 |
State | Published - 1981 |
Externally published | Yes |
Event | Unknown conference - Santa Monica, CA, USA Duration: Aug 5 1981 → Aug 7 1981 |
Other
Other | Unknown conference |
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City | Santa Monica, CA, USA |
Period | 8/5/81 → 8/7/81 |