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Topological entropy of Markov set-valued functions

Published online by Cambridge University Press:  24 September 2019

LORI ALVIN
Affiliation:
Department of Mathematics, Furman University, Greenville, SC29613, USA email lori.alvin@furman.edu
JAMES P. KELLY
Affiliation:
Department of Mathematics, Christopher Newport University, Newport News, VA 23606, USA email james.kelly@cnu.edu

Abstract

We investigate the entropy for a class of upper semi-continuous set-valued functions, called Markov set-valued functions, that are a generalization of single-valued Markov interval functions. It is known that the entropy of a Markov interval function can be found by calculating the entropy of an associated shift of finite type. In this paper, we construct a similar shift of finite type for Markov set-valued functions and use this shift space to find upper and lower bounds on the entropy of the set-valued function.

Type
Original Article
Copyright
© Cambridge University Press, 2019

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References

Adler, R. L., Konheim, A. G. and McAndrew, M. H.. Topological entropy. Trans. Amer. Math. Soc. 114 (1965), 309319.CrossRefGoogle Scholar
Alvin, L. and Kelly, J. P.. Markov set-valued functions and their inverse limits. Topology Appl. 241 (2018), 102114.CrossRefGoogle Scholar
Banič, I. and Lunder, T.. Inverse limits with generalized Markov interval functions. Bull. Malays. Math. Sci. Soc. (2) 39(2) (2016), 839848.CrossRefGoogle Scholar
Črepnjak, M. and Lunder, T.. Inverse limits with countably Markov interval functions. Glas. Mat. Ser. III 51(71)(2) (2016), 491501.CrossRefGoogle Scholar
Erceg, G. and Kennedy, J.. Topological entropy on closed sets in [0, 1]2 . Topology Appl. 246 (2018), 106136.CrossRefGoogle Scholar
Holte, S. E.. Inverse limits of Markov interval maps. Topology Appl. 123(3) (2002), 421427.CrossRefGoogle Scholar
Ingram, W. T. and Mahavier, W. S.. Inverse limits of upper semi-continuous set valued functions. Houston J. Math. 32(1) (2006), 119130.Google Scholar
Kelly, J. P. and Tennant, T.. Topological entropy of set-valued functions. Houston J. Math. 43(1) (2017), 263282.Google Scholar
Kennedy, J. and Nall, V.. Dynamical properties of shift maps on inverse limits with a set valued function. Ergod. Th. & Dynam. Sys. 38(4) (2018), 14991524.CrossRefGoogle Scholar
Lind, D. and Marcus, B.. An Introduction to Symbolic Dynamics and Coding. Cambridge University Press, Cambridge, 1995.CrossRefGoogle Scholar
Mahavier, W. S.. Inverse limits with subsets of [0, 1] × [0, 1]. Topology Appl. 141(1–3) (2004), 225231.CrossRefGoogle Scholar
Raines, B. and Tennant, T.. The specification property on a set-valued map and its inverse limit. Houston J. Math. 44(2) (2018), 665677.Google Scholar