Verfügbarkeit: Dynamical systems and ergodic theory /

Dynamical systems and ergodic theory /:

Essentially a self-contained text giving an introduction to topological dynamics and ergodic theory.

Gespeichert in:

Bibliographische Detailangaben
1. Verfasser:	Pollicott, Mark
Weitere Verfasser:	Yuri, Michiko, 1956-
Format:	Elektronisch E-Book
Sprache:	English
Veröffentlicht:	Cambridge ; New York : Cambridge University Press, 1998.
Schriftenreihe:	London Mathematical Society student texts ; 40.
Schlagworte:	Topological dynamics. Ergodic theory. Dynamique topologique. Théorie ergodique. MATHEMATICS > Calculus. MATHEMATICS > Mathematical Analysis. Ergodic theory Topological dynamics Dynamisches System Ergodentheorie Ergodiciteit. Dynamische systemen.
Online-Zugang:	Volltext
Zusammenfassung:	Essentially a self-contained text giving an introduction to topological dynamics and ergodic theory.
Beschreibung:	1 online resource (xiii, 179 pages) : illustrations
Bibliographie:	Includes bibliographical references and index.
ISBN:	9781107088955 110708895X 9781139173049 1139173049

Internformat

MARC


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245	1	0	\|a Dynamical systems and ergodic theory / \|c Mark Pollicott, Michiko Yuri.
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300			\|a 1 online resource (xiii, 179 pages) : \|b illustrations
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490	1		\|a London Mathematical Society student texts ; \|v 40
504			\|a Includes bibliographical references and index.
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505	0		\|a Cover; Series Page; Title; Copyright; CONTENTS; INTRODUCTION; PRELIMINARIES; 1 Conventions; 2 Notation; 3 Prerequisites in point set topology (CHAPTERs 1-6); 4 Pre-requisites in measure theory (CHAPTERs 7-12); 5 Subadditive sequences; References; CHAPTER 1 EXAMPLES AND BASIC PROPERTIES; 1.1 Examples; 1.2 Transitivity; 1.3 Other characterizations of transitivity; 1.4 Transitivity for subshifts of finite type; 1.5 Minimality and the Birkhoff recurrence theorem; 1.6 Commuting homeomorphisms; 1.7 Comments and references; References
505	8		\|a CHAPTER 2 AN APPLICATION OF RECURRENCE TO ARITHMETIC PROGRESSIONS2.1 Van der Waerden's theorem; 2.2 A dynamical proof; 2.3. The proofs of Sublemma 2.2.2 and Sublemma 2.2.3; 2.4 Comments and references; References; CHAPTER 3 TOPOLOGICAL ENTROPY; 3.1 Definitions; 3.2 The Perron-Frobenious theorem and subshifts of finite type; 3.3 Other definitions and examples; 3.4 Conjugacy; 3.5 Comments and references; References; CHAPTER 4 INTERVAL MAPS; 4.1 Fixed points and periodic points; 4.2 Topological entropy of interval maps; 4.3 Markov maps; 4.4 Comments and references; References
505	8		\|a CHAPTER 5 HYPERBOLIC TORAL AUTOMORPHISMS5.1 Definitions; 5.2 Entropy for Hyperbolic Toral Automorphisms; 5.3 Shadowing and semi-conjugacy; 5.4 Comments and references; References; CHAPTER 6 ROTATION NUMBERS; 6.1 Homeomorphisms of the circle and rotation numbers; 6.2 Denjoy's theorem; 6.3 Comments and references; References; CHAPTER 7 INVARIANT MEASURES; 7.1 Definitions and characterization of invariant measures; 7.2 Borel sigma-algebras for compact metric spaces; 7.3 Examples of invariant measures; 7.4 Invariant measures for other actions; 7.5 Comments and references; References
505	8		\|a CHAPTER 8 MEASURE THEORETIC ENTROPY8.1 Partitions and conditional expectations; 8.2 The entropy of a partition; 8.3 The entropy of a transformation; 8.4 The increasing martingale theorem; 8.5 Entropy and sigma-algebras; 8.6 Conditional entropy; 8.7 Proofs of Lemma 8.7 and Lemma 8.8; 8.8 Isomorphism; 8.9 Comments and references; References; CHAPTER 9 ERGODIC MEASURES; 9.1 Definitions and characterization of ergodic measures; 9.2 Poincare recurrence and Kac's theorem; 9.3 Existence of ergodic measures; 9.4 Some basic constructions in ergodic theory; 9.4.1 Skew products
505	8		\|a 9.4.2 Induced transformations and Rohlin towers9.4.3 Natural extensions; 9.5 Comments and references; References; CHAPTER 10 ERGODIC THEOREMS; 10.1 The Von Neumann ergodic theorem; 10.2 The Birkhoff theorem (for ergodic measures); 10.3 Applications of the ergodic theorems; 10.4 The Birkhoff theorem (for invariant measures); 10.5 Comments and references; References; CHAPTER 11 MIXING PROPERTIES; 11.1 Weak mixing; 11.2 A density one convergence characterization of weak mixing; 11.3 A generalization of the von Neumann ergodic theorem; 11.4 The spectral viewpoint
520			\|a Essentially a self-contained text giving an introduction to topological dynamics and ergodic theory.
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650		7	\|a MATHEMATICS \|x Calculus. \|2 bisacsh
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contents	Cover; Series Page; Title; Copyright; CONTENTS; INTRODUCTION; PRELIMINARIES; 1 Conventions; 2 Notation; 3 Prerequisites in point set topology (CHAPTERs 1-6); 4 Pre-requisites in measure theory (CHAPTERs 7-12); 5 Subadditive sequences; References; CHAPTER 1 EXAMPLES AND BASIC PROPERTIES; 1.1 Examples; 1.2 Transitivity; 1.3 Other characterizations of transitivity; 1.4 Transitivity for subshifts of finite type; 1.5 Minimality and the Birkhoff recurrence theorem; 1.6 Commuting homeomorphisms; 1.7 Comments and references; References CHAPTER 2 AN APPLICATION OF RECURRENCE TO ARITHMETIC PROGRESSIONS2.1 Van der Waerden's theorem; 2.2 A dynamical proof; 2.3. The proofs of Sublemma 2.2.2 and Sublemma 2.2.3; 2.4 Comments and references; References; CHAPTER 3 TOPOLOGICAL ENTROPY; 3.1 Definitions; 3.2 The Perron-Frobenious theorem and subshifts of finite type; 3.3 Other definitions and examples; 3.4 Conjugacy; 3.5 Comments and references; References; CHAPTER 4 INTERVAL MAPS; 4.1 Fixed points and periodic points; 4.2 Topological entropy of interval maps; 4.3 Markov maps; 4.4 Comments and references; References CHAPTER 5 HYPERBOLIC TORAL AUTOMORPHISMS5.1 Definitions; 5.2 Entropy for Hyperbolic Toral Automorphisms; 5.3 Shadowing and semi-conjugacy; 5.4 Comments and references; References; CHAPTER 6 ROTATION NUMBERS; 6.1 Homeomorphisms of the circle and rotation numbers; 6.2 Denjoy's theorem; 6.3 Comments and references; References; CHAPTER 7 INVARIANT MEASURES; 7.1 Definitions and characterization of invariant measures; 7.2 Borel sigma-algebras for compact metric spaces; 7.3 Examples of invariant measures; 7.4 Invariant measures for other actions; 7.5 Comments and references; References CHAPTER 8 MEASURE THEORETIC ENTROPY8.1 Partitions and conditional expectations; 8.2 The entropy of a partition; 8.3 The entropy of a transformation; 8.4 The increasing martingale theorem; 8.5 Entropy and sigma-algebras; 8.6 Conditional entropy; 8.7 Proofs of Lemma 8.7 and Lemma 8.8; 8.8 Isomorphism; 8.9 Comments and references; References; CHAPTER 9 ERGODIC MEASURES; 9.1 Definitions and characterization of ergodic measures; 9.2 Poincare recurrence and Kac's theorem; 9.3 Existence of ergodic measures; 9.4 Some basic constructions in ergodic theory; 9.4.1 Skew products 9.4.2 Induced transformations and Rohlin towers9.4.3 Natural extensions; 9.5 Comments and references; References; CHAPTER 10 ERGODIC THEOREMS; 10.1 The Von Neumann ergodic theorem; 10.2 The Birkhoff theorem (for ergodic measures); 10.3 Applications of the ergodic theorems; 10.4 The Birkhoff theorem (for invariant measures); 10.5 Comments and references; References; CHAPTER 11 MIXING PROPERTIES; 11.1 Weak mixing; 11.2 A density one convergence characterization of weak mixing; 11.3 A generalization of the von Neumann ergodic theorem; 11.4 The spectral viewpoint
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indexdate	2024-11-27T13:25:26Z
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isbn	9781107088955 110708895X 9781139173049 1139173049
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physical	1 online resource (xiii, 179 pages) : illustrations
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series	London Mathematical Society student texts ;
series2	London Mathematical Society student texts ;
spelling	Pollicott, Mark. Dynamical systems and ergodic theory / Mark Pollicott, Michiko Yuri. Cambridge ; New York : Cambridge University Press, 1998. 1 online resource (xiii, 179 pages) : illustrations text txt rdacontent computer c rdamedia online resource cr rdacarrier London Mathematical Society student texts ; 40 Includes bibliographical references and index. Print version record. Cover; Series Page; Title; Copyright; CONTENTS; INTRODUCTION; PRELIMINARIES; 1 Conventions; 2 Notation; 3 Prerequisites in point set topology (CHAPTERs 1-6); 4 Pre-requisites in measure theory (CHAPTERs 7-12); 5 Subadditive sequences; References; CHAPTER 1 EXAMPLES AND BASIC PROPERTIES; 1.1 Examples; 1.2 Transitivity; 1.3 Other characterizations of transitivity; 1.4 Transitivity for subshifts of finite type; 1.5 Minimality and the Birkhoff recurrence theorem; 1.6 Commuting homeomorphisms; 1.7 Comments and references; References CHAPTER 2 AN APPLICATION OF RECURRENCE TO ARITHMETIC PROGRESSIONS2.1 Van der Waerden's theorem; 2.2 A dynamical proof; 2.3. The proofs of Sublemma 2.2.2 and Sublemma 2.2.3; 2.4 Comments and references; References; CHAPTER 3 TOPOLOGICAL ENTROPY; 3.1 Definitions; 3.2 The Perron-Frobenious theorem and subshifts of finite type; 3.3 Other definitions and examples; 3.4 Conjugacy; 3.5 Comments and references; References; CHAPTER 4 INTERVAL MAPS; 4.1 Fixed points and periodic points; 4.2 Topological entropy of interval maps; 4.3 Markov maps; 4.4 Comments and references; References CHAPTER 5 HYPERBOLIC TORAL AUTOMORPHISMS5.1 Definitions; 5.2 Entropy for Hyperbolic Toral Automorphisms; 5.3 Shadowing and semi-conjugacy; 5.4 Comments and references; References; CHAPTER 6 ROTATION NUMBERS; 6.1 Homeomorphisms of the circle and rotation numbers; 6.2 Denjoy's theorem; 6.3 Comments and references; References; CHAPTER 7 INVARIANT MEASURES; 7.1 Definitions and characterization of invariant measures; 7.2 Borel sigma-algebras for compact metric spaces; 7.3 Examples of invariant measures; 7.4 Invariant measures for other actions; 7.5 Comments and references; References CHAPTER 8 MEASURE THEORETIC ENTROPY8.1 Partitions and conditional expectations; 8.2 The entropy of a partition; 8.3 The entropy of a transformation; 8.4 The increasing martingale theorem; 8.5 Entropy and sigma-algebras; 8.6 Conditional entropy; 8.7 Proofs of Lemma 8.7 and Lemma 8.8; 8.8 Isomorphism; 8.9 Comments and references; References; CHAPTER 9 ERGODIC MEASURES; 9.1 Definitions and characterization of ergodic measures; 9.2 Poincare recurrence and Kac's theorem; 9.3 Existence of ergodic measures; 9.4 Some basic constructions in ergodic theory; 9.4.1 Skew products 9.4.2 Induced transformations and Rohlin towers9.4.3 Natural extensions; 9.5 Comments and references; References; CHAPTER 10 ERGODIC THEOREMS; 10.1 The Von Neumann ergodic theorem; 10.2 The Birkhoff theorem (for ergodic measures); 10.3 Applications of the ergodic theorems; 10.4 The Birkhoff theorem (for invariant measures); 10.5 Comments and references; References; CHAPTER 11 MIXING PROPERTIES; 11.1 Weak mixing; 11.2 A density one convergence characterization of weak mixing; 11.3 A generalization of the von Neumann ergodic theorem; 11.4 The spectral viewpoint Essentially a self-contained text giving an introduction to topological dynamics and ergodic theory. Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Dynamique topologique. Théorie ergodique. MATHEMATICS Calculus. bisacsh MATHEMATICS Mathematical Analysis. bisacsh Ergodic theory fast Topological dynamics fast Dynamisches System gnd Ergodentheorie gnd http://d-nb.info/gnd/4015246-7 Ergodiciteit. gtt Dynamische systemen. gtt Dynamique topologique. ram Théorie ergodique. ram Yuri, Michiko, 1956- https://id.oclc.org/worldcat/entity/E39PCjGVC3wPJ7hHBphBrvGx9P http://id.loc.gov/authorities/names/n97053106 Print version: Pollicott, Mark. Dynamical systems and ergodic theory. Cambridge ; New York : Cambridge University Press, 1998 0521572940 (DLC) 97008812 (OCoLC)37106946 London Mathematical Society student texts ; 40. http://id.loc.gov/authorities/names/n84727069 FWS01 ZDB-4-EBA FWS_PDA_EBA https://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=570398 Volltext
spellingShingle	Pollicott, Mark Dynamical systems and ergodic theory / London Mathematical Society student texts ; Cover; Series Page; Title; Copyright; CONTENTS; INTRODUCTION; PRELIMINARIES; 1 Conventions; 2 Notation; 3 Prerequisites in point set topology (CHAPTERs 1-6); 4 Pre-requisites in measure theory (CHAPTERs 7-12); 5 Subadditive sequences; References; CHAPTER 1 EXAMPLES AND BASIC PROPERTIES; 1.1 Examples; 1.2 Transitivity; 1.3 Other characterizations of transitivity; 1.4 Transitivity for subshifts of finite type; 1.5 Minimality and the Birkhoff recurrence theorem; 1.6 Commuting homeomorphisms; 1.7 Comments and references; References CHAPTER 2 AN APPLICATION OF RECURRENCE TO ARITHMETIC PROGRESSIONS2.1 Van der Waerden's theorem; 2.2 A dynamical proof; 2.3. The proofs of Sublemma 2.2.2 and Sublemma 2.2.3; 2.4 Comments and references; References; CHAPTER 3 TOPOLOGICAL ENTROPY; 3.1 Definitions; 3.2 The Perron-Frobenious theorem and subshifts of finite type; 3.3 Other definitions and examples; 3.4 Conjugacy; 3.5 Comments and references; References; CHAPTER 4 INTERVAL MAPS; 4.1 Fixed points and periodic points; 4.2 Topological entropy of interval maps; 4.3 Markov maps; 4.4 Comments and references; References CHAPTER 5 HYPERBOLIC TORAL AUTOMORPHISMS5.1 Definitions; 5.2 Entropy for Hyperbolic Toral Automorphisms; 5.3 Shadowing and semi-conjugacy; 5.4 Comments and references; References; CHAPTER 6 ROTATION NUMBERS; 6.1 Homeomorphisms of the circle and rotation numbers; 6.2 Denjoy's theorem; 6.3 Comments and references; References; CHAPTER 7 INVARIANT MEASURES; 7.1 Definitions and characterization of invariant measures; 7.2 Borel sigma-algebras for compact metric spaces; 7.3 Examples of invariant measures; 7.4 Invariant measures for other actions; 7.5 Comments and references; References CHAPTER 8 MEASURE THEORETIC ENTROPY8.1 Partitions and conditional expectations; 8.2 The entropy of a partition; 8.3 The entropy of a transformation; 8.4 The increasing martingale theorem; 8.5 Entropy and sigma-algebras; 8.6 Conditional entropy; 8.7 Proofs of Lemma 8.7 and Lemma 8.8; 8.8 Isomorphism; 8.9 Comments and references; References; CHAPTER 9 ERGODIC MEASURES; 9.1 Definitions and characterization of ergodic measures; 9.2 Poincare recurrence and Kac's theorem; 9.3 Existence of ergodic measures; 9.4 Some basic constructions in ergodic theory; 9.4.1 Skew products 9.4.2 Induced transformations and Rohlin towers9.4.3 Natural extensions; 9.5 Comments and references; References; CHAPTER 10 ERGODIC THEOREMS; 10.1 The Von Neumann ergodic theorem; 10.2 The Birkhoff theorem (for ergodic measures); 10.3 Applications of the ergodic theorems; 10.4 The Birkhoff theorem (for invariant measures); 10.5 Comments and references; References; CHAPTER 11 MIXING PROPERTIES; 11.1 Weak mixing; 11.2 A density one convergence characterization of weak mixing; 11.3 A generalization of the von Neumann ergodic theorem; 11.4 The spectral viewpoint Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Dynamique topologique. Théorie ergodique. MATHEMATICS Calculus. bisacsh MATHEMATICS Mathematical Analysis. bisacsh Ergodic theory fast Topological dynamics fast Dynamisches System gnd Ergodentheorie gnd http://d-nb.info/gnd/4015246-7 Ergodiciteit. gtt Dynamische systemen. gtt Dynamique topologique. ram Théorie ergodique. ram
subject_GND	http://id.loc.gov/authorities/subjects/sh85136080 http://id.loc.gov/authorities/subjects/sh85044600 http://d-nb.info/gnd/4015246-7
title	Dynamical systems and ergodic theory /
title_auth	Dynamical systems and ergodic theory /
title_exact_search	Dynamical systems and ergodic theory /
title_full	Dynamical systems and ergodic theory / Mark Pollicott, Michiko Yuri.
title_fullStr	Dynamical systems and ergodic theory / Mark Pollicott, Michiko Yuri.
title_full_unstemmed	Dynamical systems and ergodic theory / Mark Pollicott, Michiko Yuri.
title_short	Dynamical systems and ergodic theory /
title_sort	dynamical systems and ergodic theory
topic	Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Dynamique topologique. Théorie ergodique. MATHEMATICS Calculus. bisacsh MATHEMATICS Mathematical Analysis. bisacsh Ergodic theory fast Topological dynamics fast Dynamisches System gnd Ergodentheorie gnd http://d-nb.info/gnd/4015246-7 Ergodiciteit. gtt Dynamische systemen. gtt Dynamique topologique. ram Théorie ergodique. ram
topic_facet	Topological dynamics. Ergodic theory. Dynamique topologique. Théorie ergodique. MATHEMATICS Calculus. MATHEMATICS Mathematical Analysis. Ergodic theory Topological dynamics Dynamisches System Ergodentheorie Ergodiciteit. Dynamische systemen.
url	https://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=570398
work_keys_str_mv	AT pollicottmark dynamicalsystemsandergodictheory AT yurimichiko dynamicalsystemsandergodictheory

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