Categorical products of cellular automata

Abstract

We study two categories of cellular automata. First, for any group G, we consider the category CA(G) whose objects are configuration spaces of the form AG, where A is a set, and whose morphisms are cellular automata of the form τ : A1G A2G. We prove that the categorical product of two configuration spaces A1G and A2G in CA(G) is the configuration space (A1 × A2)G. Then, we consider the category of generalized cellular automata GCA, whose objects are configuration spaces of the form AG, where A is a set and G is a group, and whose morphisms are φ-cellular automata of the form T : A1G1 A2G2, where φ : G2 G1 is a group homomorphism. We prove that a categorical weak product of two configuration spaces A1G1 and A2G2 in GCA is the configuration space (A1 × A2)G1 G2, where G1 G2 is the free product of G1 and G2. The previous results allow us to naturally define the product of two cellular automata in CA(G) and the weak product of two generalized cellular automata in GCA.

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