Abstract
In view of several potential applications in multivariable two-dimensional (2-D) systems theory, a practical 2-D matrix Pade/spl acute/ approximation is introduced by using a generalized inverse of the matrices. The approximants are expressed in the form of the 2-D Thiele-type continued fractions and are computed by an efficient recursive algorithm. As it's an application, the state-space realization problem of the 2-D filters is discussed.
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