Abstract
Strong system equivalence is defined for polynomial realizations of a rational matrix. It is shown that any polynomial realization is strongly system equivalent to a generalized state-space realization, and two generalized state-space realizations are strongly system equivalent if and only if they are constant system equivalent.
Original language | English |
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Pages (from-to) | 194–222 |
Journal | Journal of the Australian Mathematical Society |
Publication status | Published - 1985 |