Abstract
An algorithm for the state observer design of two-dimensional (2D) linear shift-invariant systems is proposed. For the case of one-dimensional (1D) systems, the necessary and sufficient conditions have been established for the problem, and an analytical solution for the observer feedback gain is given by K. Ogata (see "Discrete-Tone Control Systems", Prentice-Hall, 1995). Based on the well-known 1D results, a 2D observer feedback gain, K/sub e/, is derived. Furthermore, an example is given to illustrate the feasibility of the present algorithm.
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