Verfügbarkeit: Mathematical theory of entropy /

Mathematical theory of entropy /:

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Bibliographische Detailangaben
1. Verfasser:	Martin, Nathaniel F. G.
Weitere Verfasser:	England, James W.
Format:	Elektronisch E-Book
Sprache:	English
Veröffentlicht:	Cambridge [Cambridgeshire] ; New York, NY, USA : Cambridge University Press, ©1984.
Schriftenreihe:	Encyclopedia of mathematics and its applications ; v. 12. Encyclopedia of mathematics and its applications. Section, Real variables.
Schlagworte:	Entropy (Information theory) Ergodic theory. Statistical mechanics. Topological dynamics. Entropie (Théorie de l'information) Théorie ergodique. Mécanique statistique. Dynamique topologique. MATHEMATICS > Applied. MATHEMATICS > Probability & Statistics > General. Ergodic theory Statistical mechanics Topological dynamics Entropie Theorie Mathematik
Online-Zugang:	Volltext
Beschreibung:	1 online resource (xxi, 257 pages) : illustrations
Bibliographie:	Includes bibliographical references (pages 245-251) and index.
ISBN:	9781461938187 146193818X 9781107340718 1107340713 9781107387201 1107387205

Internformat

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245	1	0	\|a Mathematical theory of entropy / \|c Nathaniel F.G. Martin, James W. England ; foreword by James K. Brooks.
260			\|a Cambridge [Cambridgeshire] ; \|a New York, NY, USA : \|b Cambridge University Press, \|c ©1984.
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490	1		\|a Encyclopedia of mathematics and its applications ; \|v v. 12. \|a Section, Real variables
504			\|a Includes bibliographical references (pages 245-251) and index.
588	0		\|a Print version record.
505	0		\|a Cover; Half Title; Series Page; Title; Copyright; Dedication; CONTENTS; Editor's Statement; Foreword; Preface; Special Symbols; CHAPTER 1 Topics from Probability Theory; 1.1 Probability Spaces; 1.2 Measurable Partitions and Lebesgue Spaces; 1.3 The Lattice of Measurable Partitions; 1.4 Random Variables; 1.5 Conditional Probability and Independence; 1.6 Conditional Expectation of Random Variables; 1.7 Stochastic Processes and Dynamical Systems; 1.8 The Ergodic Theorem and the Martingale Convergence Theorem; CHAPTER 2 Entropy and Information; 2.1 Information and Uncertainty of Events
505	8		\|a 2.2 The Information Function of an Experiment and Entropy2.3 An Example; 2.4 Conditional Information and Conditional Entropy; 2.5 Properties of Entropy and Conditional Entropy; 2.6 Entropy of Arbitrary Measurable Partitions and Limit Theorems; 2.7 Rate of Information Generation; 2.8 Entropy of Dynamical Systems; 2.9 Factor Automorphisms and Factor Systems; 2.10 Shannon's Theorem and the Equipartition Property; 2.11 Entropy as a Function of Distributions; 2.12 Examples; 2.12.1 Direct Products; 2.12.2 Skew Products; 2.12.3 Powers of Endomorphisms; 2.12 A Flows; 2.12.5 Induced Automorphisms
505	8		\|a 2.12.6 Periodic Automorphisms2.12.7 Rotations of the Circle; 2.12.8 Ergodic Automorphisms of Compact Abelian Groups; 2.12.9 Bernoulli Shifts; 2.12.10 Markov Shifts; 2.12.11 S-Automorphisms; 2.12.12 Unilateral Shifts; 2.12.13 Continued Fraction Transformations; 2.12.14 f-Transformations; 2.13 Sequence Entropy and r-Entropy; CHAPTER 3 Information Theory; 3.1 A Model of an Information System; 3.2 The Source; 3.3 Coding; 3.4 The Channel; 3.5 The Noisy Channel Coding Theorem; 3.6 Source Coding; CHAPTER 4 Ergodic Theory; 4.1 Introduction; 4.2 Unitary Operator of a System and Bernoulli Shifts
505	8		\|a 4.3 K-Systems and K-Automorphisms4.4 Spaces of Ordered Partitions, Weak Independence, and Weak Dependence; 4.5 Coding and Ornstein's Fundamental Lemma; 4.6 The Isomorphism Theorem for Bernoulli Systems; 4.7 Characterization of Bernoulli Systems; 4.8 Relative Isomorphism; 4.9 Special Flows and Equivalence Theory; CHAPTER 5 Topological Dynamics; 5.1 Introduction; 5.2 Definition and Basic Properties of Topological Entropy; 5.3 Connection between Topological and Measure Theoretic Entropy; 5.4 An Alternative Definition of Topological Entropy; CHAPTER 6 Statistical Mechanics; 6.1 Introduction
505	8		\|a 6.2 Classical Continuous Systems6.3 Classical Lattice Systems; 6.4 Gibbs States for Lattice Systems; 6.5 Equilibrium States and the Concepts of Entropy and Pressure; BIBLIOGRAPHY; Index
650		0	\|a Entropy (Information theory) \|0 http://id.loc.gov/authorities/subjects/sh85044152
650		0	\|a Ergodic theory. \|0 http://id.loc.gov/authorities/subjects/sh85044600
650		0	\|a Statistical mechanics. \|0 http://id.loc.gov/authorities/subjects/sh85127571
650		0	\|a Topological dynamics. \|0 http://id.loc.gov/authorities/subjects/sh85136080
650		6	\|a Entropie (Théorie de l'information)
650		6	\|a Théorie ergodique.
650		6	\|a Mécanique statistique.
650		6	\|a Dynamique topologique.
650		7	\|a MATHEMATICS \|x Applied. \|2 bisacsh
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700	1		\|a England, James W. \|0 http://id.loc.gov/authorities/names/n81010124
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contents	Cover; Half Title; Series Page; Title; Copyright; Dedication; CONTENTS; Editor's Statement; Foreword; Preface; Special Symbols; CHAPTER 1 Topics from Probability Theory; 1.1 Probability Spaces; 1.2 Measurable Partitions and Lebesgue Spaces; 1.3 The Lattice of Measurable Partitions; 1.4 Random Variables; 1.5 Conditional Probability and Independence; 1.6 Conditional Expectation of Random Variables; 1.7 Stochastic Processes and Dynamical Systems; 1.8 The Ergodic Theorem and the Martingale Convergence Theorem; CHAPTER 2 Entropy and Information; 2.1 Information and Uncertainty of Events 2.2 The Information Function of an Experiment and Entropy2.3 An Example; 2.4 Conditional Information and Conditional Entropy; 2.5 Properties of Entropy and Conditional Entropy; 2.6 Entropy of Arbitrary Measurable Partitions and Limit Theorems; 2.7 Rate of Information Generation; 2.8 Entropy of Dynamical Systems; 2.9 Factor Automorphisms and Factor Systems; 2.10 Shannon's Theorem and the Equipartition Property; 2.11 Entropy as a Function of Distributions; 2.12 Examples; 2.12.1 Direct Products; 2.12.2 Skew Products; 2.12.3 Powers of Endomorphisms; 2.12 A Flows; 2.12.5 Induced Automorphisms 2.12.6 Periodic Automorphisms2.12.7 Rotations of the Circle; 2.12.8 Ergodic Automorphisms of Compact Abelian Groups; 2.12.9 Bernoulli Shifts; 2.12.10 Markov Shifts; 2.12.11 S-Automorphisms; 2.12.12 Unilateral Shifts; 2.12.13 Continued Fraction Transformations; 2.12.14 f-Transformations; 2.13 Sequence Entropy and r-Entropy; CHAPTER 3 Information Theory; 3.1 A Model of an Information System; 3.2 The Source; 3.3 Coding; 3.4 The Channel; 3.5 The Noisy Channel Coding Theorem; 3.6 Source Coding; CHAPTER 4 Ergodic Theory; 4.1 Introduction; 4.2 Unitary Operator of a System and Bernoulli Shifts 4.3 K-Systems and K-Automorphisms4.4 Spaces of Ordered Partitions, Weak Independence, and Weak Dependence; 4.5 Coding and Ornstein's Fundamental Lemma; 4.6 The Isomorphism Theorem for Bernoulli Systems; 4.7 Characterization of Bernoulli Systems; 4.8 Relative Isomorphism; 4.9 Special Flows and Equivalence Theory; CHAPTER 5 Topological Dynamics; 5.1 Introduction; 5.2 Definition and Basic Properties of Topological Entropy; 5.3 Connection between Topological and Measure Theoretic Entropy; 5.4 An Alternative Definition of Topological Entropy; CHAPTER 6 Statistical Mechanics; 6.1 Introduction 6.2 Classical Continuous Systems6.3 Classical Lattice Systems; 6.4 Gibbs States for Lattice Systems; 6.5 Equilibrium States and the Concepts of Entropy and Pressure; BIBLIOGRAPHY; Index
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indexdate	2024-11-27T13:25:29Z
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isbn	9781461938187 146193818X 9781107340718 1107340713 9781107387201 1107387205
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psigel	ZDB-4-EBA
publishDate	1984
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publisher	Cambridge University Press,
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series	Encyclopedia of mathematics and its applications ; Encyclopedia of mathematics and its applications. Section, Real variables.
series2	Encyclopedia of mathematics and its applications ; Section, Real variables
spelling	Martin, Nathaniel F. G. http://id.loc.gov/authorities/names/n81010125 Mathematical theory of entropy / Nathaniel F.G. Martin, James W. England ; foreword by James K. Brooks. Cambridge [Cambridgeshire] ; New York, NY, USA : Cambridge University Press, ©1984. 1 online resource (xxi, 257 pages) : illustrations text txt rdacontent computer c rdamedia online resource cr rdacarrier Encyclopedia of mathematics and its applications ; v. 12. Section, Real variables Includes bibliographical references (pages 245-251) and index. Print version record. Cover; Half Title; Series Page; Title; Copyright; Dedication; CONTENTS; Editor's Statement; Foreword; Preface; Special Symbols; CHAPTER 1 Topics from Probability Theory; 1.1 Probability Spaces; 1.2 Measurable Partitions and Lebesgue Spaces; 1.3 The Lattice of Measurable Partitions; 1.4 Random Variables; 1.5 Conditional Probability and Independence; 1.6 Conditional Expectation of Random Variables; 1.7 Stochastic Processes and Dynamical Systems; 1.8 The Ergodic Theorem and the Martingale Convergence Theorem; CHAPTER 2 Entropy and Information; 2.1 Information and Uncertainty of Events 2.2 The Information Function of an Experiment and Entropy2.3 An Example; 2.4 Conditional Information and Conditional Entropy; 2.5 Properties of Entropy and Conditional Entropy; 2.6 Entropy of Arbitrary Measurable Partitions and Limit Theorems; 2.7 Rate of Information Generation; 2.8 Entropy of Dynamical Systems; 2.9 Factor Automorphisms and Factor Systems; 2.10 Shannon's Theorem and the Equipartition Property; 2.11 Entropy as a Function of Distributions; 2.12 Examples; 2.12.1 Direct Products; 2.12.2 Skew Products; 2.12.3 Powers of Endomorphisms; 2.12 A Flows; 2.12.5 Induced Automorphisms 2.12.6 Periodic Automorphisms2.12.7 Rotations of the Circle; 2.12.8 Ergodic Automorphisms of Compact Abelian Groups; 2.12.9 Bernoulli Shifts; 2.12.10 Markov Shifts; 2.12.11 S-Automorphisms; 2.12.12 Unilateral Shifts; 2.12.13 Continued Fraction Transformations; 2.12.14 f-Transformations; 2.13 Sequence Entropy and r-Entropy; CHAPTER 3 Information Theory; 3.1 A Model of an Information System; 3.2 The Source; 3.3 Coding; 3.4 The Channel; 3.5 The Noisy Channel Coding Theorem; 3.6 Source Coding; CHAPTER 4 Ergodic Theory; 4.1 Introduction; 4.2 Unitary Operator of a System and Bernoulli Shifts 4.3 K-Systems and K-Automorphisms4.4 Spaces of Ordered Partitions, Weak Independence, and Weak Dependence; 4.5 Coding and Ornstein's Fundamental Lemma; 4.6 The Isomorphism Theorem for Bernoulli Systems; 4.7 Characterization of Bernoulli Systems; 4.8 Relative Isomorphism; 4.9 Special Flows and Equivalence Theory; CHAPTER 5 Topological Dynamics; 5.1 Introduction; 5.2 Definition and Basic Properties of Topological Entropy; 5.3 Connection between Topological and Measure Theoretic Entropy; 5.4 An Alternative Definition of Topological Entropy; CHAPTER 6 Statistical Mechanics; 6.1 Introduction 6.2 Classical Continuous Systems6.3 Classical Lattice Systems; 6.4 Gibbs States for Lattice Systems; 6.5 Equilibrium States and the Concepts of Entropy and Pressure; BIBLIOGRAPHY; Index Entropy (Information theory) http://id.loc.gov/authorities/subjects/sh85044152 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Statistical mechanics. http://id.loc.gov/authorities/subjects/sh85127571 Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Entropie (Théorie de l'information) Théorie ergodique. Mécanique statistique. Dynamique topologique. MATHEMATICS Applied. bisacsh MATHEMATICS Probability & Statistics General. bisacsh Entropy (Information theory) fast Ergodic theory fast Statistical mechanics fast Topological dynamics fast Entropie gnd http://d-nb.info/gnd/4014894-4 Theorie gnd Mathematik gnd England, James W. http://id.loc.gov/authorities/names/n81010124 Print version: Martin, Nathaniel F.G. Mathematical theory of entropy. Cambridge [Cambridgeshire] ; New York, NY, USA : Cambridge University Press, ©1984 0521302323 (DLC) 85121434 (OCoLC)12081912 Encyclopedia of mathematics and its applications ; v. 12. http://id.loc.gov/authorities/names/n42010632 Encyclopedia of mathematics and its applications. Section, Real variables. http://id.loc.gov/authorities/names/n84711569 FWS01 ZDB-4-EBA FWS_PDA_EBA https://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=616937 Volltext
spellingShingle	Martin, Nathaniel F. G. Mathematical theory of entropy / Encyclopedia of mathematics and its applications ; Encyclopedia of mathematics and its applications. Section, Real variables. Cover; Half Title; Series Page; Title; Copyright; Dedication; CONTENTS; Editor's Statement; Foreword; Preface; Special Symbols; CHAPTER 1 Topics from Probability Theory; 1.1 Probability Spaces; 1.2 Measurable Partitions and Lebesgue Spaces; 1.3 The Lattice of Measurable Partitions; 1.4 Random Variables; 1.5 Conditional Probability and Independence; 1.6 Conditional Expectation of Random Variables; 1.7 Stochastic Processes and Dynamical Systems; 1.8 The Ergodic Theorem and the Martingale Convergence Theorem; CHAPTER 2 Entropy and Information; 2.1 Information and Uncertainty of Events 2.2 The Information Function of an Experiment and Entropy2.3 An Example; 2.4 Conditional Information and Conditional Entropy; 2.5 Properties of Entropy and Conditional Entropy; 2.6 Entropy of Arbitrary Measurable Partitions and Limit Theorems; 2.7 Rate of Information Generation; 2.8 Entropy of Dynamical Systems; 2.9 Factor Automorphisms and Factor Systems; 2.10 Shannon's Theorem and the Equipartition Property; 2.11 Entropy as a Function of Distributions; 2.12 Examples; 2.12.1 Direct Products; 2.12.2 Skew Products; 2.12.3 Powers of Endomorphisms; 2.12 A Flows; 2.12.5 Induced Automorphisms 2.12.6 Periodic Automorphisms2.12.7 Rotations of the Circle; 2.12.8 Ergodic Automorphisms of Compact Abelian Groups; 2.12.9 Bernoulli Shifts; 2.12.10 Markov Shifts; 2.12.11 S-Automorphisms; 2.12.12 Unilateral Shifts; 2.12.13 Continued Fraction Transformations; 2.12.14 f-Transformations; 2.13 Sequence Entropy and r-Entropy; CHAPTER 3 Information Theory; 3.1 A Model of an Information System; 3.2 The Source; 3.3 Coding; 3.4 The Channel; 3.5 The Noisy Channel Coding Theorem; 3.6 Source Coding; CHAPTER 4 Ergodic Theory; 4.1 Introduction; 4.2 Unitary Operator of a System and Bernoulli Shifts 4.3 K-Systems and K-Automorphisms4.4 Spaces of Ordered Partitions, Weak Independence, and Weak Dependence; 4.5 Coding and Ornstein's Fundamental Lemma; 4.6 The Isomorphism Theorem for Bernoulli Systems; 4.7 Characterization of Bernoulli Systems; 4.8 Relative Isomorphism; 4.9 Special Flows and Equivalence Theory; CHAPTER 5 Topological Dynamics; 5.1 Introduction; 5.2 Definition and Basic Properties of Topological Entropy; 5.3 Connection between Topological and Measure Theoretic Entropy; 5.4 An Alternative Definition of Topological Entropy; CHAPTER 6 Statistical Mechanics; 6.1 Introduction 6.2 Classical Continuous Systems6.3 Classical Lattice Systems; 6.4 Gibbs States for Lattice Systems; 6.5 Equilibrium States and the Concepts of Entropy and Pressure; BIBLIOGRAPHY; Index Entropy (Information theory) http://id.loc.gov/authorities/subjects/sh85044152 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Statistical mechanics. http://id.loc.gov/authorities/subjects/sh85127571 Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Entropie (Théorie de l'information) Théorie ergodique. Mécanique statistique. Dynamique topologique. MATHEMATICS Applied. bisacsh MATHEMATICS Probability & Statistics General. bisacsh Entropy (Information theory) fast Ergodic theory fast Statistical mechanics fast Topological dynamics fast Entropie gnd http://d-nb.info/gnd/4014894-4 Theorie gnd Mathematik gnd
subject_GND	http://id.loc.gov/authorities/subjects/sh85044152 http://id.loc.gov/authorities/subjects/sh85044600 http://id.loc.gov/authorities/subjects/sh85127571 http://id.loc.gov/authorities/subjects/sh85136080 http://d-nb.info/gnd/4014894-4
title	Mathematical theory of entropy /
title_auth	Mathematical theory of entropy /
title_exact_search	Mathematical theory of entropy /
title_full	Mathematical theory of entropy / Nathaniel F.G. Martin, James W. England ; foreword by James K. Brooks.
title_fullStr	Mathematical theory of entropy / Nathaniel F.G. Martin, James W. England ; foreword by James K. Brooks.
title_full_unstemmed	Mathematical theory of entropy / Nathaniel F.G. Martin, James W. England ; foreword by James K. Brooks.
title_short	Mathematical theory of entropy /
title_sort	mathematical theory of entropy
topic	Entropy (Information theory) http://id.loc.gov/authorities/subjects/sh85044152 Ergodic theory. http://id.loc.gov/authorities/subjects/sh85044600 Statistical mechanics. http://id.loc.gov/authorities/subjects/sh85127571 Topological dynamics. http://id.loc.gov/authorities/subjects/sh85136080 Entropie (Théorie de l'information) Théorie ergodique. Mécanique statistique. Dynamique topologique. MATHEMATICS Applied. bisacsh MATHEMATICS Probability & Statistics General. bisacsh Entropy (Information theory) fast Ergodic theory fast Statistical mechanics fast Topological dynamics fast Entropie gnd http://d-nb.info/gnd/4014894-4 Theorie gnd Mathematik gnd
topic_facet	Entropy (Information theory) Ergodic theory. Statistical mechanics. Topological dynamics. Entropie (Théorie de l'information) Théorie ergodique. Mécanique statistique. Dynamique topologique. MATHEMATICS Applied. MATHEMATICS Probability & Statistics General. Ergodic theory Statistical mechanics Topological dynamics Entropie Theorie Mathematik
url	https://search.ebscohost.com/login.aspx?direct=true&scope=site&db=nlebk&AN=616937
work_keys_str_mv	AT martinnathanielfg mathematicaltheoryofentropy AT englandjamesw mathematicaltheoryofentropy

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