Zhihua Xiong, Yixin Xu, et al.
International Journal of Modelling, Identification and Control
If X is a compact, zero-dimensional group and T is an expansive, transitive automorphism then (X, T) is shown to be topologically conjugate to a full shift on finitely many symbols. The problem of classifying such automorphisms up to simultaneous algebraic isomorphism and topological conjugacy is discussed but not solved. It is proved that for any entropy there are only finitely many such equivalence classes. When the entropy is log p for a prime p, there is only one equivalence class. All are then equivalent to [omitted formula]. © 1987, Foundation for Environmental Conservation. All rights reserved.
Zhihua Xiong, Yixin Xu, et al.
International Journal of Modelling, Identification and Control
Chai Wah Wu
Linear Algebra and Its Applications
David W. Jacobs, Daphna Weinshall, et al.
IEEE Transactions on Pattern Analysis and Machine Intelligence
Laxmi Parida, Pier F. Palamara, et al.
BMC Bioinformatics