Subshifts, $\lambda$-graph bisystems and $C^*$-algebras
Abstract
We introduce a notion of -graph bisystem. It consists of a pair of two labeled Bratteli diagrams over alphabets , respectively, and satisfy certain compatibility condition of their labeling on edges. Its matrix presentation is called a symbolic matrix bisystem. We first show that any -graph bisystem presents subshifts and conversely any subshift is presented by a -graph bisystem, called the canonical -graph bisystem for the subshift. We introduce a notion of properly strong shift equivalence on symbolic matrix bisystems and show that two subshifts are topologically conjugate if and only if their canonical symbolic matrix bisystems are properly strong shift equivalent. A -graph bisystem yields a pair of -algebra written . We show that the -algebras are universal unique -algebras subject to certain operator relations among canonical generators encoded by -graph bisystem If a -graph bisystem comes from a -graph system of a finite directed graph, then the associated subshift is the two-sided topological Markov shift by its transition matrix of the graph, and the associated -algebra is isomorphic to whereas the other -algebra is isomorphic to of the commutative -algebra on by the automorphism induced by the homeomorphism of the shift This phenomena shows a duality between and .
Keywords
Cite
@article{arxiv.1904.06464,
title = {Subshifts, $\lambda$-graph bisystems and $C^*$-algebras},
author = {Kengo Matsumoto},
journal= {arXiv preprint arXiv:1904.06464},
year = {2020}
}
Comments
63 pages. Sections 7, 8 and 10 are corrected, to appear in J. Math. Anal. Appl