Topological conjugacy and transitivity for a class of piecewise monotone maps of the interval

This paper studies the set limit of a sequence of invariant sets corresponding to a convergent sequence of piecewise monotone interval maps. To do this, the notion of essential entropy-carrying set is introduced. A piecewise monotone map f with an essential entropy-carrying horseshoe S(f) and a sequence of piecewise monotone maps [Formula: see text] converging to f is considered. It is proven that if each gi has an invariant set T(gi) with at least as much topological entropy as f, then the set limit of [Formula: see text] contains S(f).

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Topological conjugacies of piecewise monotone interval maps

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171201004343 ◽

2001 ◽

Vol 25 (2) ◽

pp. 119-127 ◽

Cited By ~ 2

Author(s):

Nikos A. Fotiades ◽

Moses A. Boudourides

Keyword(s):

Topological Entropy ◽

Piecewise Linear ◽

Topological Conjugacy ◽

Markov Condition ◽

Piecewise Monotone ◽

Interval Maps ◽

Linear Maps ◽

Piecewise Linear Maps ◽

Topological Conjugacies

Our aim is to establish the topological conjugacy between piecewise monotone expansive interval maps and piecewise linear maps. First, we are concerned with maps satisfying a Markov condition and next with those admitting a certain countable partition. Finally, we compute the topological entropy in the Markov case.

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Strict inequalities for the entropy of transitive piecewise monotone maps

Discrete and Continuous Dynamical Systems ◽

10.3934/dcds.2005.13.451 ◽

2005 ◽

Vol 13 (2) ◽

pp. 451-468 ◽

Cited By ~ 7

Author(s):

Michał Misiurewicz ◽

◽

Peter Raith ◽

Keyword(s):

Piecewise Monotone ◽

Monotone Maps ◽

Strict Inequalities

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Linking and the shadowing property for piecewise monotone maps

Proceedings of the American Mathematical Society ◽

10.1090/s0002-9939-1991-1079695-2 ◽

1991 ◽

Vol 113 (1) ◽

pp. 251-251 ◽

Cited By ~ 3

Author(s):

Liang Chen

Keyword(s):

Shadowing Property ◽

Piecewise Monotone ◽

Monotone Maps

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Piecewise monotone maps

CRM Monograph Series - Dynamical Zeta Functions for Piecewise Monotone Maps of the Interval ◽

10.1090/crmm/004/02 ◽

2004 ◽

pp. 23-60

Keyword(s):

Piecewise Monotone ◽

Monotone Maps

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DYNAMICAL ZETA FUNCTIONS FOR PIECEWISE MONOTONE MAPS OF THE INTERVAL (CRM Monograph Series 4)

Bulletin of the London Mathematical Society ◽

10.1112/blms/28.3.327 ◽

1996 ◽

Vol 28 (3) ◽

pp. 327-329

Author(s):

William Parry

Keyword(s):

Zeta Functions ◽

Monograph Series ◽

Piecewise Monotone ◽

Monotone Maps

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SOME RESULTS ON ENTROPY AND SEQUENCE ENTROPY

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127499001218 ◽

1999 ◽

Vol 09 (09) ◽

pp. 1731-1742 ◽

Cited By ~ 7

Author(s):

F. BALIBREA ◽

V. JIMÉNEZ LÓPEZ ◽

J. S. CÁNOVAS PEÑA

Keyword(s):

Topological Entropy ◽

Elementary Proof ◽

Type Inequality ◽

Topological Invariants ◽

Metric Entropy ◽

Sequence Entropy ◽

Piecewise Monotone ◽

Monotone Maps ◽

Topological Sequence Entropy

In this paper we study some formulas involving metric and topological entropy and sequence entropy. We summarize some classical formulas satisfied by metric and topological entropy and ask the question whether the same or similar results hold for sequence entropy. In general the answer is negative; still some questions involving these formulas remain open. We make a special emphasis on the commutativity formula for topological entropy h(f ◦ g)=h(g ◦ f) recently proved by Kolyada and Snoha. We give a new elementary proof and use similar ideas to prove commutativity formulas for metric entropy and other topological invariants. Finally we prove a Misiurewicz–Szlenk type inequality for topological sequence entropy for piecewise monotone maps on the interval I=[0, 1]. For this purpose we introduce the notion of upper entropy.

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