ON BIFURCATION SETS FOR SYMBOLIC DYNAMICS IN THE MILNOR–THURSTON WORLD

We show the continuity of the topological entropy for the Milnor–Thurston world of interval maps and we compute the minimum and the maximum values for the entropy of a maximal sequence of any given period. We also study (fractal) geometric properties of the bifurcation set in the parameter space and in the associated phase spaces Σ[a, b], and we compare these results with the previously known results about the lexicographic world of interval maps (related to Lorenz-like maps).

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SIMPLE AND COMPLEX DYNAMICS FOR ONE-DIMENSIONAL MANIFOLD MAPS

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127495001022 ◽

1995 ◽

Vol 05 (05) ◽

pp. 1351-1355

Author(s):

VLADIMIR FEDORENKO

Keyword(s):

Topological Entropy ◽

Complex Dynamics ◽

Periodic Points ◽

Dimensional Manifold ◽

One Dimensional ◽

Circle Maps ◽

Interval Maps ◽

Chain Recurrent Set ◽

Recurrent Set

We give a characterization of complex and simple interval maps and circle maps (in the sense of positive or zero topological entropy respectively), formulated in terms of the description of the dynamics of the map on its chain recurrent set. We also describe the behavior of complex maps on their periodic points.

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Subspaces of interval maps related to the topological entropy

Topological Methods in Nonlinear Analysis ◽

10.12775/tmna.2019.065 ◽

2019 ◽

pp. 1 ◽

Cited By ~ 1

Author(s):

Xiaoxin Fan ◽

Jian Li ◽

Yini Yang ◽

Zhongqiang Yang

Keyword(s):

Topological Entropy ◽

Interval Maps

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Subshifts on Infinite Alphabets and Their Entropy

Entropy ◽

10.3390/e22111293 ◽

2020 ◽

Vol 22 (11) ◽

pp. 1293

Author(s):

Sharwin Rezagholi

Keyword(s):

Growth Rate ◽

Markov Chains ◽

Topological Entropy ◽

Spectral Radius ◽

Symbolic Dynamics ◽

Infinite Graphs ◽

Complexity Function ◽

Countably Infinite

We analyze symbolic dynamics to infinite alphabets by endowing the alphabet with the cofinite topology. The topological entropy is shown to be equal to the supremum of the growth rate of the complexity function with respect to finite subalphabets. For the case of topological Markov chains induced by countably infinite graphs, our approach yields the same entropy as the approach of Gurevich We give formulae for the entropy of countable topological Markov chains in terms of the spectral radius in l2.

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ESSENTIAL ENTROPY-CARRYING HORSESHOES AS SET LIMITS

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127412501957 ◽

2012 ◽

Vol 22 (08) ◽

pp. 1250195 ◽

Cited By ~ 1

Author(s):

STEVEN M. PEDERSON

Keyword(s):

Topological Entropy ◽

Convergent Sequence ◽

Invariant Set ◽

Invariant Sets ◽

Piecewise Monotone ◽

Interval Maps ◽

Monotone Map ◽

Monotone Maps

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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The Lyapunov spectrum of some parabolic systems

Ergodic Theory and Dynamical Systems ◽

10.1017/s0143385708080462 ◽

2009 ◽

Vol 29 (3) ◽

pp. 919-940 ◽

Cited By ~ 30

Author(s):

KATRIN GELFERT ◽

MICHAŁ RAMS

Keyword(s):

Lyapunov Exponent ◽

Hausdorff Dimension ◽

Lyapunov Exponents ◽

Topological Entropy ◽

Level Set ◽

Level Sets ◽

Parabolic Systems ◽

Lyapunov Spectrum ◽

Interval Maps ◽

Set Of Points

AbstractWe study the Hausdorff dimension for Lyapunov exponents for a class of interval maps which includes several non-hyperbolic situations. We also analyze the level sets of points with given lower and upper Lyapunov exponents and, in particular, with zero lower Lyapunov exponent. We prove that the level set of points with zero exponent has full Hausdorff dimension, but carries no topological entropy.

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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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CHAOTIC BEHAVIOR OF INTERVAL MAPS AND TOTAL VARIATIONS OF ITERATES

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127404010540 ◽

2004 ◽

Vol 14 (07) ◽

pp. 2161-2186 ◽

Cited By ~ 26

Author(s):

GOONG CHEN ◽

TINGWEN HUANG ◽

YU HUANG

Keyword(s):

Nonlinear Systems ◽

Initial Data ◽

Topological Entropy ◽

Chaotic Behavior ◽

Homoclinic Orbits ◽

Oscillatory Behavior ◽

Exponential Rate ◽

Interval Maps ◽

Interval Map ◽

Sensitive Dependence

Interval maps reveal precious information about the chaotic behavior of general nonlinear systems. If an interval map f:I→I is chaotic, then its iterates fnwill display heightened oscillatory behavior or profiles as n→∞. This manifestation is quite intuitive and is, here in this paper, studied analytically in terms of the total variations of fnon subintervals. There are four distinctive cases of the growth of total variations of fnas n→∞:(i) the total variations of fnon I remain bounded;(ii) they grow unbounded, but not exponentially with respect to n;(iii) they grow with an exponential rate with respect to n;(iv) they grow unbounded on every subinterval of I.We study in detail these four cases in relations to the well-known notions such as sensitive dependence on initial data, topological entropy, homoclinic orbits, nonwandering sets, etc. This paper is divided into three parts. There are eight main theorems, which show that when the oscillatory profiles of the graphs of fnare more extreme, the more complex is the behavior of the system.

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Topological entropy and chaos of interval maps

Nonlinear Analysis ◽

10.1016/0362-546x(87)90029-0 ◽

1987 ◽

Vol 11 (1) ◽

pp. 105-114 ◽

Cited By ~ 2

Author(s):

Bau-Sen Du

Keyword(s):

Topological Entropy ◽

Interval Maps

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ENTROPY OF MAPS WITH HORIZONTAL GAPS

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127404010047 ◽

2004 ◽

Vol 14 (04) ◽

pp. 1489-1492 ◽

Cited By ~ 1

Author(s):

MICHAŁ MISIUREWICZ

Keyword(s):

Topological Entropy ◽

Entropy Function ◽

Devil's Staircase ◽

Piecewise Monotone ◽

Interval Maps ◽

Continuous Map ◽

Devil’S Staircase ◽

Staircase Structure

We study the behavior of topological entropy in one-parameter families of interval maps obtained from a continuous map f by truncating it at the level depending on the parameter. When f is piecewise monotone, the entropy function has the devil's staircase structure.

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Permutations and topological entropy for interval maps

Nonlinearity ◽

10.1088/0951-7715/16/3/310 ◽

2003 ◽

Vol 16 (3) ◽

pp. 971-976 ◽

Cited By ~ 15

Author(s):

Micha Misiurewicz

Keyword(s):

Topological Entropy ◽

Interval Maps

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