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ToolsWard, Tom (1997) Three results on mixing shapes. New York Journal of Mathematics, 3A. pp. 1-10.
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Abstract
Let a be a Zd-action (d ³ 2) by automorphisms of a compact metric abelian group. For any non-linear shape I Ì Zd, there is an a with the property that I is a minimal mixing shape for a. The only implications of the form ``I is a mixing shape for a Þ J is a mixing shape for a'' are trivial ones for which I contains a translate of J. If all shapes are mixing for a, then a is mixing of all orders. In contrast to the algebraic case, if b is a Zd-action by measure-preserving transformations, then all shapes mixing for b does not preclude rigidity. Finally, we show that mixing of all orders in cones - a property that coincides with mixing of all orders for Z-actions - holds for algebraic mixing Z2-actions.
| Item Type: | Article |
|---|---|
| Faculty \ School: | Faculty of Science > School of Mathematics |
| Related URLs: | |
| Depositing User: | Vishal Gautam |
| Date Deposited: | 18 Mar 2011 14:48 |
| Last Modified: | 15 Dec 2022 02:04 |
| URI: | https://ueaeprints.uea.ac.uk/id/eprint/18608 |
| DOI: |
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