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Measure-theoretic sequence entropy pairs and mean sensitivity

Part of: Ergodic theory Topological dynamics

Published online by Cambridge University Press:  19 September 2023

FELIPE GARCÍA-RAMOS Open the ORCID record for FELIPE GARCÍA-RAMOS [Opens in a new window]  and
VÍCTOR MUÑOZ-LÓPEZ
FELIPE GARCÍA-RAMOS*
Affiliation:
Universidad Autonoma de San Luis Potosi, San Luis Potosi 78000, Mexico (e-mail: soygenn@gmail.com) Faculty of Mathematics and Computer Science, Jagiellonian University, Profesora Stanisława Łojasiewicza 6, 30-348 Kraków, Poland
VÍCTOR MUÑOZ-LÓPEZ
Affiliation:
Universidad Autonoma de San Luis Potosi, San Luis Potosi 78000, Mexico (e-mail: soygenn@gmail.com)
*
e-mail: fgramos@conahcyt.mx
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Abstract

We characterize measure-theoretic sequence entropy pairs of continuous actions of abelian groups using mean sensitivity. This addresses an open question of Li and Yu [On mean sensitive tuples. J. Differential Equations 297 (2021), 175–200]. As a consequence of our results, we provide a simpler characterization of Kerr and Li’s independence sequence entropy pairs ($\mu $-IN-pairs) when the measure is ergodic and the group is abelian.

Keywords

sequence entropy pairsmean sensitivityentropy pairsIN-pairs

MSC classification

Primary: 37A15: General groups of measure-preserving transformations 37A35: Entropy and other invariants, isomorphism, classification 37B05: Transformations and group actions with special properties (minimality, distality, proximality, etc.)
Type
Original Article
Information
Ergodic Theory and Dynamical Systems , First View , pp. 1 - 10
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Copyright
© The Author(s), 2023. Published by Cambridge University Press

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References

Barbieri, S., García-Ramos, F. and Li, H.. Markovian properties of continuous group actions: algebraic actions, entropy and the homoclinic group. Adv. Math. 397 (2022), 108196.CrossRefGoogle Scholar
Blanchard, F.. A disjointness theorem involving topological entropy. Bull. Soc. Math. France 121(4) (1993), 465478.CrossRefGoogle Scholar
Blanchard, F., Host, B., Maass, A., Martinez, S. and Rudolph, D.. Entropy pairs for a measure. Ergod. Th. & Dynam. Sys. 15(4) (1995), 621632.CrossRefGoogle Scholar
Chung, N.-P. and Li, H.. Homoclinic groups, IE groups, and expansive algebraic actions. Invent. Math. 199(3) (2015), 805858.CrossRefGoogle Scholar
Darji, U. B. and García-Ramos, F.. Local entropy theory and descriptive complexity. Preprint, 2023, arXiv:2107.09263.Google Scholar
Darji, U. B. and Kato, H.. Chaos and indecomposability. Adv. Math. 304 (2017), 793808.CrossRefGoogle Scholar
Fuhrmann, G., Gröger, M. and Lenz, D.. The structure of mean equicontinuous group actions. Israel J. Math. 247(1) (2022), 75123.CrossRefGoogle Scholar
García-Ramos, F.. Weak forms of topological and measure-theoretical equicontinuity: relationships with discrete spectrum and sequence entropy. Ergod. Th. & Dynam. Sys. 37(4) (2017), 12111237.CrossRefGoogle Scholar
García-Ramos, F., Jäger, T. and Ye, X.. Mean equicontinuity, almost automorphy and regularity. Israel J. Math. 243(1) (2021), 155183.CrossRefGoogle Scholar
García-Ramos, F. and Li, H.. Local entropy theory and applications, manuscript in preparation.Google Scholar
García-Ramos, F. and Marcus, B.. Mean sensitive, mean equicontinuous and almost periodic functions for dynamical systems. Discrete Contin. Dyn. Syst. 39(2) (2019), 729746.CrossRefGoogle Scholar
Glasner, E. and Ye, X.. Local entropy theory. Ergod. Th. & Dynam. Sys. 29(2) (2009), 321356.CrossRefGoogle Scholar
Huang, W., Li, J., Thouvenot, J.-P., Xu, L. and Ye, X.. Bounded complexity, mean equicontinuity and discrete spectrum. Ergod. Th. & Dynam. Sys. 41(2) (2021), 494533.CrossRefGoogle Scholar
Huang, W., Lu, P. and Ye, X.. Measure-theoretical sensitivity and equicontinuity. Israel J. Math. 183(1) (2011), 233283.CrossRefGoogle Scholar
Huang, W., Maass, A. and Ye, X.. Sequence entropy pairs and complexity pairs for a measure. Ann. Inst. Fourier (Grenoble) 54(4) (2004), 10051028.CrossRefGoogle Scholar
Kerr, D. and Li, H.. Independence in topological and C*-dynamics. Math. Ann. 338(4) (2007), 869926.CrossRefGoogle Scholar
Kerr, D. and Li, H.. Combinatorial independence in measurable dynamics. J. Funct. Anal. 256(5) (2009), 13411386.CrossRefGoogle Scholar
Kushnirenko, A. G.. On metric invariants of entropy type. Russian Math. Surveys 22(5) (1967), 5361.CrossRefGoogle Scholar
Li, J., Liu, C., Tu, S. and Yu, T.. Sequence entropy tuples and mean sensitive tuples. Ergod. Th. & Dynam. Sys. doi:10.1017/etds.2023.5. Published online 20 February 2023.CrossRefGoogle Scholar
Li, J. and Tu, S. M.. Density-equicontinuity and density-sensitivity. Acta Math. Sin. (Engl. Ser.) 37(2) (2021), 345361.CrossRefGoogle Scholar
Li, J. and Yu, T.. On mean sensitive tuples. J. Differential Equations 297 (2021), 175200.CrossRefGoogle Scholar
Lindenstrauss, E.. Pointwise theorems for amenable groups. Invent. Math. 146(2) (2001), 259295.CrossRefGoogle Scholar
Yu, T., Zhang, G. and Zhang, R.. Discrete spectrum for amenable group actions. Discrete Contin. Dyn. Syst. 41(12) (2021), 58715886.CrossRefGoogle Scholar