Abstract
For a dynamical system (X, f), the notion of topological transitivity has been studied by some researchers. There are several definitions of this property, and it is part of the folklore of dynamical systems that under some hypotheses, they are equivalent. In this paper, our aim is to introduce and study some properties of topological transitivity in pointfree topology, for which we first need to define in a way what makes them conservative extensions of topological transitivity defined by G.D. Birkhoff. We describe the way the different properties are related to each other in pointfree topology.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Acosta, G., Hernández-Gutiérrez, R., Naghmouchi, I., Oprocha, P.: Periodic points and transitivity on dendrites. Ergodic Theory Dyn. Syst. 37(7), 2017–2033 (2017)
Akin, E., Carlson, J.D.: Conceptions of topologicl transitivity. Topol. Appl. 159(12), 2815–2830 (2012)
Akin, E., Auslander, J., Berg, K.: When is a transitive map chaotic? In: Bergelson, V., March, P., Rosenblatt, J. (eds.), Convergence in Ergodic Theory and Probability (Columbus, OH, 1993), de Gruyter, Berlin, pp. 25–40 (1996)
Akin, E., Auslander, J., Nagar, A.: Variations on the concept of topological transitivity. Stud. Math. 235(3), 225–249 (2016)
Bayart, F., Matheron, E.: Dynamics of Linear Operators, Cambridge Tracts in Mathematics 179. Cambridge University Press, Cambridge (2009)
Banks, J.: Regular periodic decompositions for topologically transitive maps. Ergodic Theory Dyn. Syst. 17(3), 505–529 (1997)
Birkhoff, G.D.: Demonstration d’un theoreme elementaire sur les fonctions entieres. C. R. Acad. Sci. Paris 189, 473–475 (1929)
Block, L.S., Coppel, W.A.: Dynamics in One Dimension. Lecture Notes in Math, vol. 1513. Springer, New York (1992)
Cairns, G., Kolganova, A., Nielsen, A.: Topological transitivity and mixing notions for group actions. Rocky Mount. J. Math. 37(2), 371–397 (2007)
Degirmenci, S., Kocak, S.: Existence of a dense orbit and topological transitivity: when are they equivalent? Acta Math. Hungar. 99(3), 185–187 (2003)
He, L., Gao, Y., Yang, F.: Some dynamical properties of continuous semi-flows having topological transitivity. Chaos Solitons Fract. 14(8), 1159–1167 (2002)
Isbell, J.R.: Atomless parts of spaces. Math. Scand. 31, 5–32 (1972)
Kolyada, S., Snoha, L.: Some aspects of topological transitivity a survey. In: Ludwig, R., Jaroslav, S., Gyorgy, T., (eds.) Iteration Theory (ECIT 94, Opava, Czech. Repub.) Grazer Math. Ber., vol. 334, Karl-Franzens-Univ. Graz, Graz, pp. 3–35 (1997)
Li, J.: Transitive points via Furstenberg family. Topol. Appl. 158(16), 2221–2231 (2011)
Grosse-Erdmann, K.-G., Peris, A.: Frequently dense orbits. C. R. Math. Acad. Sci. Paris Ser. I 341(2), 123–128 (2005)
Golzy, M.: Transitivity in point-free topology. Bull. Aust. Math. Soc. 80, 317–323 (2009)
Johnstone, P.T.: Stone Spaces. Cambridge University Press, Cambridge (1982)
Moothathu, T.K.S.: Diagonal points having dense orbit. Colloq. Math. 120, 127–138 (2010)
Picado, J., Pultr, A.: Frames and Locales: Topology Without Points. Frontiers in Mathematics, Birkhauser/Springer, Basel AG, Basel (2012)
Wang, X.Y., Huang, Y.: Recurrence of transitive points in dynamical systems with the specification property. Acta. Math. Sin.-Engl. Ser. 34, 1879–1891 (2018)
Acknowledgements
Thanks are due to the referee for helpful comments that have improved the readability of this paper and for providing Proposition 3.2.
Author information
Authors and Affiliations
Corresponding author
Additional information
Communicated by Presented by A. Dow.
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Estaji, A.A., Robat Sarpoushi, M. & Barzanouni, A. Localic transitivity. Algebra Univers. 83, 29 (2022). https://doi.org/10.1007/s00012-022-00783-4
Received:
Accepted:
Published:
DOI: https://doi.org/10.1007/s00012-022-00783-4