Textile systems on lambda-graph systems
Abstract
The notions of symbolic matrix system and -graph system for a subshift are generalizations of symbolic matrix and -graph (= finite symbolic matrix) for a sofic shift respectively ([Doc. Math. 4(1999), 285-340]). M. Nasu introduced the notion of textile system for a pair of graph homomorphisms to study automorphisms and endomorphisms of topological Markov shifts ([Mem. Amer. Math. Soc. 546,114(1995)]). In this paper, we formulate textile systems on -graph systems and study automorphisms on subshifts. We will prove that for a forward automorphism of a subshift , the automorphisms can be explicitly realized as a subshift defined by certain symbolic matrix systems coming from both the strong shift equivalence representing and the subshift . As an application of this result, if an automorphism of a subshift is a simple automorphism, the dynamical system is topologically conjugate to the subshift
Cite
@article{arxiv.math/0607520,
title = {Textile systems on lambda-graph systems},
author = {Kengo Matsumoto},
journal= {arXiv preprint arXiv:math/0607520},
year = {2007}
}
Comments
40pages, AMStexfile