Higher rank graphs, k-subshifts and k-automata
Abstract
Given a k-graph we construct a Markov space M , and a collection of k pairwise commuting cellular automata on M , providing for a factorization of Markov's shift. Iterating these maps we obtain an action of Nk on M which is then used to form a semidirect product groupoid M Nk. This groupoid turns out to be identical to the path groupoid constructed by Kumjian and Pask, and hence its C*-algebra is isomorphic to the higher rank graph C*-algebra of .
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