Wen Huang, Zhengxing Lian, Song Shao, Xiangdong Ye
Published 2020-02-20Version 1
In this paper it is proved that if a minimal system has the property that its sequence entropy is uniformly bounded for all sequences, then it has only finitely many ergodic measures and is an almost finite to one extension of its maximal equicontinuous factor. This result is obtained as an application of a general criteria which states that if a minimal system is an almost finite to one extension of its maximal equicontinuous factor and has no infinite independent sets of length $k$ for some $k\ge 2$, then it has only finitely many ergodic measures.
Density of the set of symbolic dynamics with all ergodic measures supported on periodic orbits
Arcwise connectedness of the set of ergodic measures of hereditary shifts
Thomae's function and the space of ergodic measures
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