Abstract
We study a family of area-preserving maps of the 2-torus and show that they are pseudo-Anosov. We present a method to construct finite Markov partitions for this family which utilizes their common symmetries. Through these partitions we show explicitly that each map is a tower over a first return map, intimately linked to a toral automorphism. This enables us to calculate directly some dimensional characteristics of the dynamics. © 2009 IOP Publishing Ltd and London Mathematical Society.
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CITATION STYLE
APA
Demers, M. F., & Wojtkowski, M. P. (2009). A family of pseudo-Anosov maps. Nonlinearity, 22(7), 1743–1760. https://doi.org/10.1088/0951-7715/22/7/013
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