C*-Algebras of one-sided subshifts over arbitrary alphabets

Abstract

We associate a C*-algebra OX with a subshift over an arbitrary, possibly infinite, alphabet. We show that OX is a full invariant for topological conjugacy of the subshifts of Ott, Tomforde, and Willis. When the alphabet is countable, we show that OX is an invariant for isometric conjugacy of subshifts with the product metric. For a suitable partial action associated with a subshift over a countable alphabet, we show that OX is also an invariant for continuous orbit equivalence. Additionally, we give a concrete way to compute the K-theory of OX and illustrate it with two examples.

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