Homotopy minimal periods for expanding maps on infra-nilmanifolds

Journal of the Mathematical Society of Japan

Online ISSN : 1881-1167
Print ISSN : 0025-5645
ISSN-L : 0025-5645

Homotopy minimal periods for expanding maps on infra-nilmanifolds

Jong Bum Lee, Xuezhi Zhao

著者情報

キーワード: essentially reducible, expanding maps, homotopy minimal periods, infra-nilmanifolds

ジャーナルフリー

2007 年 59 巻 1 号 p. 179-184

DOI https://doi.org/10.2969/jmsj/1180135506

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抄録

We prove that the sets of homotopy minimal periods for expanding maps on n-dimensional infra-nilmanifolds are uniformly cofinite, i.e., there exists a positive integer m₀, which depends only on n, such that for any integer m≥m₀, for any n-dimensional infra-nilmanifold M, and for any expanding map f on M, any self-map on M homotopic to f has a periodic point of least period m, namely, [m₀,∞)⊂HPer(f). This extends the main result, Theorem 4.6, of [13] from periods to homotopy periods.

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© 2007 The Mathematical Society of Japan

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