<p class="MsoNormal">Ergodic theory provides a powerful lens for understanding dynamical systems, recasting disordered and seemingly random behavior in the&#xa0;language of&#xa0;probability&#xa0;theory. This book offers a&#xa0;concise, rigorous&#xa0;introduction to the subject, suitable both as a graduate-level textbook and as a reference for both pure&#xa0;and applied mathematicians.&#xa0;</p><ul style="margin-top: 0in;" type="disc"><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list .5in;"><strong><span style="mso-fareast-font-family: 'Times New Roman';">Part I</span></strong><span style="mso-fareast-font-family: 'Times New Roman';">&#xa0;(Chapters 1–7) lays the foundation, covering invariant measures, measure-theoretic isomorphisms, ergodicity, mixing, entropy, and culminating in the Shannon–McMillan–Breiman Theorem.</span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list .5in;"><strong><span style="mso-fareast-font-family: 'Times New Roman';">Part II</span></strong><span style="mso-fareast-font-family: 'Times New Roman';">&#xa0;(Chapters 8–13) shifts focus to continuous maps of metric spaces, exploring&#xa0;the collection of&#xa0;invariant measures&#xa0;corresponding to a given map.&#xa0;</span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list .5in;"><strong><span style="mso-fareast-font-family: 'Times New Roman';">Part III</span></strong><span style="mso-fareast-font-family: 'Times New Roman';">&#xa0;(Chapters&#xa0;14–16) presents advanced topics rarely found&#xa0;in textbooks at&#xa0;this level, including SRB measures, their deep connection to entropy and Lyapunov exponents, and extensions to&#xa0;two&#xa0;important settings:&#xa0;random and infinite-dimensional&#xa0;dynamical systems.</span></li></ul><p><span style="font-size: 11.0pt; font-family: 'Calibri',sans-serif; mso-fareast-font-family: Calibri; mso-fareast-theme-font: minor-latin; mso-ansi-language: EN-US; mso-fareast-language: EN-US; mso-bidi-language: AR-SA;">Throughout, the authors emphasize not only the mathematical elegance of ergodic theory but also its practical relevance and rich connections to other areas of mathematics, from information theory to stochastic processes.</span></p>

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Ergodic Theory

  • Alex Blumenthal,
  • Lai-Sang Young

摘要

Ergodic theory provides a powerful lens for understanding dynamical systems, recasting disordered and seemingly random behavior in the language of probability theory. This book offers a concise, rigorous introduction to the subject, suitable both as a graduate-level textbook and as a reference for both pure and applied mathematicians. 

  • Part I (Chapters 1–7) lays the foundation, covering invariant measures, measure-theoretic isomorphisms, ergodicity, mixing, entropy, and culminating in the Shannon–McMillan–Breiman Theorem.
  • Part II (Chapters 8–13) shifts focus to continuous maps of metric spaces, exploring the collection of invariant measures corresponding to a given map. 
  • Part III (Chapters 14–16) presents advanced topics rarely found in textbooks at this level, including SRB measures, their deep connection to entropy and Lyapunov exponents, and extensions to two important settings: random and infinite-dimensional dynamical systems.

Throughout, the authors emphasize not only the mathematical elegance of ergodic theory but also its practical relevance and rich connections to other areas of mathematics, from information theory to stochastic processes.