Ferhat Şah scite author profile

In this paper, we study one dimensional finite linear cellular automata with reflective boundary condition by using matrix algebra built on the field Z p . We present an algorithm for determining the reversibility of this family of cellular automata. We also answer the reversibility question for some special subfamilies. Finally, we present some examples of this family of cellular automata under the reflective boundary condition.

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Reversibility Problem of Multidimensional Finite Cellular Automata

Chang

Akın³

et al. 2017

J Stat Phys

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While the reversibility of multidimensional cellular automata is undecidable and there exists a criterion for determining if a multidimensional linear cellular automaton is reversible, there are only a few results about the reversibility problem of multidimensional linear cellular automata under boundary conditions. This work proposes a criterion for testing the reversibility of a multidimensional linear cellular automaton under null boundary condition and an algorithm for the computation of its reverse, if it exists. The investigation of the dynamical behavior of a multidimensional linear cellular automaton under null boundary condition is equivalent to elucidating the properties of block Toeplitz matrix. The proposed criterion significantly reduce the computational cost whenever the number of cells or the dimension is large; the discussion can also apply to cellular automata under periodic boundary condition with a minor modification

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Characterization of three dimensional cellular automata over Zm

Şah¹,

Şiap²,

Akın³

2012

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Ferhat Şah

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Reversibility Problem of Multidimensional Finite Cellular Automata

Characterization of three dimensional cellular automata over Zm

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