Stable proper nth-order inverses
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A stable proper right (left) n th-order inverse of a given linear time-invariant system of order n can always be constructed, via a simple algorithm, if a proper right (left) inverse exists and the zeros of the given system are stable. Furthermore, it is shown that all of the poles of this inverse can be arbitrarily assigned except those which equal the zeros of the given system.
[1] J. Massey,et al. Invertibility of linear time-invariant dynamical systems , 1969 .
[2] P. Falb,et al. Invariants and Canonical Forms under Dynamic Compensation , 1976 .
[3] W. Wolovich,et al. On the stability of solutions to minimal and nonminimal design problems , 1977 .