Abstract
Abstract In this paper, a two-dimensional (2D) Hankel theory is developed. It is shown that the degree of a 2D transfer function is determinable from the rank of its Hankel matrix. The developed theorem encompasses the one-dimensional Hankel matrix as a special case. The result is useful in the computation of the greatest common divisor. It may also be useful in identification, realization, partial realization and coding problems.
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