论文信息 - Binary and multi-valued cellular array models of linear distributed parameter systems

Binary and multi-valued cellular array models of linear distributed parameter systems

Cellular array models of linear distributed parameter systems are proposed. One of the arrays is a discrete model of diffusion systems. The cells have one-bit variables /spl isin/{1, -1} and change their values according to a pseudo-random walker rule. Another cellular array is a one-dimensional discrete wave propagation system. The array makes unidirectional waves with spatially distributed three-level variables /spl isin/{1, 0, -1}. Numerical experiment shows that the temporally or spatially averaged behavior of these cellular arrays coincides with the solutions of original diffusion and wave equations within 2.2% of error.

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