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Topological entropy

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In mathematics, the topological entropy of a topological dynamical system is a nonnegative extended real number that is a measure of the complexity of the system. Topological entropy was first introduced in 1965 by Adler, Konheim and McAndrew. Their definition was modelled after the definition of the Kolmogorov–Sinai, or metric entropy. Later, Dinaburg and Rufus Bowen gave a different, weaker definition reminiscent of the Hausdorff dimension. The second definition clarified the meaning of the topological entropy: for a system given by an iterated function, the topological entropy represents the exponential growth rate of the number of distinguishable orbits of the iterates. An important variational principle relates the notions of topological and measure-theoretic entropy.

Definition

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A topological dynamical system consists of a Hausdorff topological space X (usually assumed to be compact) and a continuous self-map f : X → X. Its topological entropy is a nonnegative extended real number that can be defined in various ways, which are known to be equivalent.

Definition of Adler, Konheim, and McAndrew

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Let X be a compact Hausdorff topological space. For any finite open cover C of X, let H(C) be the logarithm (usually to base 2) of the smallest number of elements of C that cover X.[1] For two covers C and D, let be their (minimal) common refinement, which consists of all the non-empty intersections of a set from C with a set from D, and similarly for multiple covers.

For any continuous map f: X → X, the following limit exists:

Then the topological entropy of f, denoted h(f), is defined to be the supremum of H(f,C) over all possible finite covers C of X.

Interpretation

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The parts of C may be viewed as symbols that (partially) describe the position of a point x in X: all points xCi are assigned the symbol Ci . Imagine that the position of x is (imperfectly) measured by a certain device and that each part of C corresponds to one possible outcome of the measurement. then represents the logarithm of the minimal number of "words" of length n needed to encode the points of X according to the behavior of their first n − 1 iterates under f, or, put differently, the total number of "scenarios" of the behavior of these iterates, as "seen" by the partition C. Thus the topological entropy is the average (per iteration) amount of information needed to describe long iterations of the map f.

Definition of Bowen and Dinaburg

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This definition [2][3][4] uses a metric on X (actually, a uniform structure would suffice). This is a narrower definition than that of Adler, Konheim, and McAndrew,[5] as it requires the additional metric structure on the topological space (but is independent of the choice of metrics generating the given topology). However, in practice, the Bowen-Dinaburg topological entropy is usually much easier to calculate.

Let (X, d) be a compact metric space and f: X → X be a continuous map. For each natural number n, a new metric dn is defined on X by the formula

Given any ε > 0 and n ≥ 1, two points of X are ε-close with respect to this metric if their first n iterates are ε-close. This metric allows one to distinguish in a neighborhood of an orbit the points that move away from each other during the iteration from the points that travel together. A subset E of X is said to be (n, ε)-separated if each pair of distinct points of E is at least ε apart in the metric dn. Denote by N(n, ε) the maximum cardinality of an (n, ε)-separated set. The topological entropy of the map f is defined by

Interpretation

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Since X is compact, N(n, ε) is finite and represents the number of distinguishable orbit segments of length n, assuming that we cannot distinguish points within ε of one another. A straightforward argument shows that the limit defining h(f) always exists in the extended real line (but could be infinite). This limit may be interpreted as the measure of the average exponential growth of the number of distinguishable orbit segments. In this sense, it measures complexity of the topological dynamical system (X, f). Rufus Bowen extended this definition of topological entropy in a way which permits X to be non-compact under the assumption that the map f is uniformly continuous.

Properties

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  • Topological entropy is an invariant of topological dynamical systems, meaning that it is preserved by topological conjugacy.
  • Let be an expansive homeomorphism of a compact metric space and let be a topological generator. Then the topological entropy of relative to is equal to the topological entropy of , i.e.
  • Let be a continuous transformation of a compact metric space , let be the measure-theoretic entropy of with respect to and let be the set of all -invariant Borel probability measures on X. Then the variational principle for entropy[6] states that
.
  • In general the maximum of the quantities over the set is not attained, but if additionally the entropy map is upper semicontinuous, then a measure of maximal entropy - meaning a measure in with - exists.
  • If has a unique measure of maximal entropy , then is ergodic with respect to .

Examples

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  • Let by denote the full two-sided k-shift on symbols . Let denote the partition of into cylinders of length 1. Then is a partition of for all and the number of sets is respectively. The partitions are open covers and is a topological generator. Hence
. The measure-theoretic entropy of the Bernoulli -measure is also . Hence it is a measure of maximal entropy. Further on it can be shown that no other measures of maximal entropy exist.
  • Let be an irreducible matrix with entries in and let be the corresponding subshift of finite type. Then where is the largest positive eigenvalue of .

Notes

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  1. ^ Since X is compact, H(C) is always finite, even for an infinite cover C. The use of arbitrary covers yields the same value of entropy.
  2. ^ Bowen, Rufus (1971). "Entropy for Group Endomorphisms and Homogeneous Spaces". Transactions of the American Mathematical Society. 153: 401–414. doi:10.1090/S0002-9947-1971-0274707-X. ISSN 0002-9947.
  3. ^ Bowen, Rufus (1971). "Periodic Points and Measures for Axiom A Diffeomorphisms". Transactions of the American Mathematical Society. 154: 377–397. doi:10.2307/1995452. ISSN 0002-9947. JSTOR 1995452.
  4. ^ Dinaburg, Efim (1970). "RELATIONSHIP BETWEEN TOPOLOGICAL ENTROPY AND METRIC ENTROPY". Doklady Akademii Nauk SSSR. 170: 19.
  5. ^ Adler, R. L.; Konheim, A. G.; McAndrew, M. H. (1965). "Topological Entropy". Transactions of the American Mathematical Society. 114 (2): 309. doi:10.1090/S0002-9947-1965-0175106-9. ISSN 0002-9947.
  6. ^ Goodman, T. N. T. (1971). "Relating Topological Entropy and Measure Entropy". Bulletin of the London Mathematical Society. 3 (2): 176–180. doi:10.1112/blms/3.2.176. ISSN 1469-2120.

See also

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References

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This article incorporates material from Topological Entropy on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.

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