Title :
Realization by inspection
Author :
Rosenthal, Joachim ; Schumacher, J.M.
Author_Institution :
Dept. of Math., Notre Dame Univ., IN, USA
fDate :
9/1/1997 12:00:00 AM
Abstract :
We investigate which first-order representations can be obtained from high-order representations of linear systems “by inspection”, that is, just by rearrangement of the data. Under quite weak conditions it is possible to obtain minimal realizations in the so-called pencil form; under stronger conditions one can obtain minimal realizations in standard state-space form by inspection. The development is based on a reformulation of the realization problem as a problem of finding a complete set of basis vectors for the nullspace of a given constant matrix. Since no numerical computation is needed, the realization method in particular is suitable for situations in which some of the coefficients are symbolic rather than numerical
Keywords :
differential equations; linear differential equations; linear systems; polynomial matrices; realisation theory; basis vectors; first-order representations; high-order representations; linear systems; minimal realizations; nullspace; pencil form; state-space form; weak conditions; Control systems; Distributed control; Equations; Feedback; Finishing; Inspection; Jacobian matrices; Open loop systems; Polynomials; Sufficient conditions;
Journal_Title :
Automatic Control, IEEE Transactions on
