M. Einsiedler
Asymptotic geometry of non-mixing sequences
Einsiedler, M.; Ward, T.
Authors
T. Ward
Abstract
The exact order of mixing for zero-dimensional algebraic dynamical systems is not entirely understood. Here we use valuations in function fields to exhibit an asymptotic shape in non-mixing sequences for algebraic Z^2-actions. This gives a relationship between the order of mixing and the convex hull of the defining polynomial. Using this result, we show that an algebraic dynamical system for which any shape of cardinality three is mixing is mixing of order three, and for any k greater than or equal to 1 exhibit examples that are k-fold mixing but not (k+1)-fold mixing.
Citation
Einsiedler, M., & Ward, T. (2003). Asymptotic geometry of non-mixing sequences. Ergodic Theory and Dynamical Systems, 23(1), 75-85. https://doi.org/10.1017/s0143385702000950
Journal Article Type | Article |
---|---|
Publication Date | Feb 1, 2003 |
Deposit Date | Oct 12, 2012 |
Publicly Available Date | Oct 24, 2012 |
Journal | Ergodic Theory and Dynamical Systems |
Print ISSN | 0143-3857 |
Electronic ISSN | 1469-4417 |
Publisher | Cambridge University Press |
Peer Reviewed | Peer Reviewed |
Volume | 23 |
Issue | 1 |
Pages | 75-85 |
DOI | https://doi.org/10.1017/s0143385702000950 |
Public URL | https://durham-repository.worktribe.com/output/1472226 |
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Copyright Statement
© Copyright Cambridge University Press 2003. This paper has been published in a revised form subsequent to editorial input by Cambridge University Press in "Ergodic theory and dynamical systems" (23: 1 (2003) 75-85) http://journals.cambridge.org/action/displayJournal?jid=ETS
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