| General Ergodic Theory of Groupsof Measure Preserving Transformations | p. 1 |
| Ergodic Theory of Smooth Dynamical Systems | p. 103 |
| Dynamical Systems on Homogeneous Spaces | p. 264 |
| The Dynamics of Billiard Flowsin Rational Polygons | p. 360 |
| Dynamical Systemsof Statistical Mechanics and Kinetic Equations | p. 383 |
| Subject Index | p. 455 |
| General Ergodic Theory of Groupsof Measure Preserving Transformations | |
| Basic Notions of Ergodic Theory and Examples of Dynamical Systems | p. 2 |
| Dynamical Systems with Invariant Measures | p. 2 |
| First Corollaries of the Existence of Invariant Measures. Ergodic Theorems | p. 11 |
| Ergodicity. Decomposition into Ergodic Components. Various Mixing Conditions | p. 18 |
| General Constructions | p. 23 |
| Direct Products of Dynamical Systems | p. 23 |
| Skew Products of Dynamical Systems | p. 24 |
| Factor-Systems | p. 25 |
| Integral and Induced Automorphisms | p. 25 |
| Special Flows and Special Representations of Flows | p. 26 |
| Natural Extensions of Endomorphisms | p. 28 |
| Spectral Theory of Dynamical Systems | p. 30 |
| Groups of Unitary Operators and Semigroups of Isometric Operators Adjoint to Dynamical Systems | p. 30 |
| The Structure of the Dynamical Systems with Pure Point and Quasidiscrete Spectra | p. 33 |
| Examples of Spectral Analysis of Dynamical Systems | p. 35 |
| Spectral Analysis of Gauss Dynamical Systems | p. 36 |
| Entropy Theory of Dynamical Systems | p. 38 |
| Entropy and Conditional Entropy of a Partition | p. 39 |
| Entropy of a Dynamical System | p. 40 |
| The Structure of Dynamical Systems of Positive Entropy | p. 43 |
| The Isomorphy Problem for Bernoulli Automorphisms and K-Systems | p. 45 |
| Equivalence of Dynamical Systems in the Sense of Kakutani | p. 53 |
| Shifts in the Spaces of Sequences and Gibbs Measures | p. 57 |
| Periodic Approximations and Their Applications. Ergodic Theorems, Spectral and Entropy Theory for the General Group Actions | p. 61 |
| Approximation Theory of Dynamical Systems by Periodic Ones. Flows on the Two-Dimensional Torus | p. 61 |
| Flows on the Surfaces of Genus p ≥ 1 and Interval Exchange Transformations | p. 66 |
| General Group Actions | p. 69 |
| Introduction | p. 69 |
| General Definition of the Actions of Locally Compact Groups on Lebesgue Spaces | p. 70 |
| Ergodic Theorems | p. 71 |
| Spectral Theory | p. 74 |
| Entropy Theory for the Actions of General Groups | p. 76 |
| Trajectory Theory | p. 80 |
| Statements of Main Results | p. 80 |
| Sketch of the Proof. Tame Partitions | p. 84 |
| Trajectory Theory for Amenable Groups | p. 89 |
| Trajectory Theory for Non-Amenable Groups. Rigidity | p. 91 |
| Concluding Remarks. Relationship Between Trajectory Theory and Operator Algebras | p. 94 |
| Bibliography | p. 95 |
| Additional Bibliography | p. 101 |
| Ergodic Theory of SmoothDynamical Systems | |
| Stochasticity of Smooth Dynamical Systems. The Elements of KAM-Theory | p. 106 |
| Integrable and Nonintegrable Smooth Dynamical Systems. The Hierarchy of Stochastic Properties of Deterministic Dynamics | p. 106 |
| The Kolmogorov-Arnold-Moser Theory (KAM-Theory) | p. 109 |
| General Theory of Smooth Hyperbolic Dynamical Systems | p. 113 |
| Hyperbolicity of Individual Trajectories | p. 113 |
| Introductory Remarks | p. 113 |
| Uniform Hyperbolicity | p. 114 |
| Nonuniform Hyperbolicity | p. 115 |
| Local Manifolds | p. 116 |
| Global Manifolds | p. 118 |
| Basic Classes of Smooth Hyperbolic Dynamical Systems. Definitions and Examples | p. 118 |
| Anosov Systems | p. 118 |
| Hyperbolic Sets | p. 121 |
| Locally Maximal Hyperbolic Sets | p. 124 |
| Axiom A-Diffeomorphisms | p. 125 |
| Hyperbolic Attractors. Repellers | p. 126 |
| Partially Hyperbolic Dynamical Systems | p. 128 |
| Mather Theory | p. 129 |
| Nonuniformely Hyperbolic Dynamical Systems. Lyapunov Exponents | p. 131 |
| Ergodic Properties of Smooth Hyperbolic Dynamical Systems | p. 133 |
| u-Gibbs Measures | p. 133 |
| Symbolic Dynamics | p. 135 |
| Measures of Maximal Entropy | p. 137 |
| Construction of u-Gibbs Measures | p. 137 |
| Topological Pressure and Topological Entropy | p. 138 |
| Properties of u-Gibbs Measures | p. 141 |
| Small Stochastic Perturbations | p. 142 |
| Equilibrium States and Their Ergodic Properties | p. 143 |
| Ergodic Properties of Dynamical Systems with Nonzero Lyapunov Exponents | p. 144 |
| Ergodic Properties of Anosov Systems and of UPH-Systems | p. 146 |
| Continuous Time Dynamical Systems | p. 149 |
| Hyperbolic Geodesic Flows | p. 149 |
| Manifolds with Negative Curvature | p. 149 |
| Riemannian Metrics Without Conjugate (or Focal) Points | p. 153 |
| Entropy of Geodesic Flows | p. 156 |
| Riemannian Metrics of Nonpositive Curvature | p. 157 |
| Geodesic Flows on Manifolds with Constant Negative Curvature | p. 158 |
| Dimension-like Characteristics of Invariant Sets for Dynamical Systems | p. 161 |
| Introductory Remarks | p. 161 |
| Hausdorff Dimension | p. 161 |
| Other Dimension Characteristics | p. 164 |
| Carathéodory Dimension Structure. Carathéodory Dimension Characteristics | p. 167 |
| Examples of C-structures and Carathéodory Dimension Characteristics | p. 169 |
| Multifractal Formalism | p. 176 |
| Coupled Map Lattices | p. 182 |
| Additional References | p. 190 |
| Billiards and Other Hyperbolic Systems | p. 192 |
| Billiards | p. 192 |
| The General Definition of a Billiard | p. 192 |
| Billiards in Polygons and Polyhedrons | p. 194 |
| Billiards in Domains with Smooth Convex Boundary | p. 196 |
| Dispersing or Sinai Billiards | p. 198 |
| The Lorentz Gas and Hard Spheres Gas | p. 206 |
| Semi-dispersing Billiards and Boltzmann Hypotheses | p. 206 |
| Billiards in Domains with Boundary Possessing Focusing Components | p. 209 |
| Hyperbolic Dynamical Systems with Singularities (a General Approach) | p. 215 |
| Markov Approximations and Symbolic Dynamics for Hyperbolic Billiards | p. 217 |
| Statistical Properties of Dispersing Billiards and of the Lorentz Gas | p. 219 |
| Transport Coefficients for the Simplest Mechanical Models | p. 222 |
| Strange Attractors | p. 224 |
| Definition of a Strange Attractor | p. 224 |
| The Lorenz Attractor | p. 225 |
| Some Other Examples of Hyperbolic Strange Attractors | p. 230 |
| Additional References | p. 231 |
| Ergodic Theory of One-Dimensional Mappings | p. 234 |
| Expanding Maps | p. 234 |
| Definitions, Examples, the Entropy Formula | p. 234 |
| Walters Theorem | p. 237 |
| Absolutely Continuous Invariant Measures for Nonexpanding Maps | p. 239 |
| Some Examples | p. 239 |
| Intermittency of Stochastic and Stable Systems | p. 241 |
| Ergodic Properties of Absolutely Continuous Invariant Measures | p. 243 |
| Feigenbaum Universality Law | p. 245 |
| The Phenomenon of Universality | p. 245 |
| Doubling Transformation | p. 247 |
| Neighborhood of the Fixed Point | p. 249 |
| Properties of Maps Belonging to the Stable Manifold of ¿ | p. 251 |
| Rational Endomorphisms of the Riemann Sphere | p. 252 |
| The Julia Set and Its Complement | p. 252 |
| The Stability Properties of Rational Endomorphisms | p. 254 |
| Ergodic and Dimensional Properties of Julia Sets | p. 255 |
| Bibliography | p. 256 |
| Dynamical Systemson Homogeneous Spaces | |
| Dynamical Systems on Homogeneous Spaces | p. 266 |
| Introduction | p. 266 |
| Measures on homogeneous spaces | p. 266 |
| Examples of lattices | p. 268 |
| Ergodicity and its consequences | p. 271 |
| Isomorphisms and factors of affine automorphisms | p. 272 |
| Affine automorphisms of tori and nilmanifolds | p. 273 |
| Ergodic properties; the case of tori | p. 273 |
| Ergodic properties on nilmanifolds | p. 275 |
| Unipotent affine automorphisms | p. 278 |
| Quasi-unipotent affine automorphisms | p. 280 |
| Closed invariant sets of automorphisms | p. 281 |
| Dynamics of hyperbolic automorphisms | p. 281 |
| More on invariant sets of hyperbolic toral automorphisms | p. 283 |
| Distribution of orbits of hyperbolic automorphisms | p. 285 |
| Dynamics of ergodic toral automorphisms | p. 286 |
| Actions of groups of affine automorphisms | p. 287 |
| Group-induced translation flows; special cases | p. 289 |
| Flows on solvmanifolds | p. 289 |
| Homogeneous spaces of semisimple groups | p. 292 |
| Flows on low-dimensional homogeneous spaces | p. 295 |
| Ergodic properties of flows on general homogeneous spaces | p. 297 |
| Horospherical subgroups and Mautner phenomenon | p. 298 |
| Ergodicity of one-parameter flows | p. 300 |
| Invariant functions and ergodic decomposition | p. 301 |
| Actions of subgroups | p. 303 |
| Duality | p. 304 |
| Spectrum and mixing of group-induced flows | p. 305 |
| Mixing of higher orders | p. 306 |
| Entropy | p. 307 |
| K-mixing, Bernoullicity | p. 308 |
| Group-induced flows with hyperbolic structure | p. 309 |
| Anosov automorphisms | p. 309 |
| Affine automorphisms with a hyperbolic fixed point | p. 311 |
| Anosov flows | p. 312 |
| Invariant measures of group-induced flows | p. 313 |
| Invariant measures of Ad-unipotent flows | p. 313 |
| Invariant measures and epimorphic subgroups | p. 316 |
| Invariant measures of actions of diagonalisable groups | p. 318 |
| A weak recurrence property and infinite invariant measures | p. 318 |
| Distribution of orbits and polynomial trajectories | p. 320 |
| A uniform version of uniform distribution | p. 321 |
| Distribution of translates of closed orbits | p. 323 |
| Orbit closures of group-induced flows | p. 323 |
| Homogeneity of orbit closures | p. 323 |
| Orbit closures of horospherical subgroups | p. 325 |
| Orbits of reductive subgroups | p. 327 |
| Orbit closures of one-parameter flows | p. 328 |
| Dense orbits and minimal sets of flows | p. 330 |
| Divergent trajectories of flows | p. 332 |
| Bounded orbits and escapable sets | p. 333 |
| Duality and lattice-actions on vector spaces | p. 335 |
| Duality between orbits | p. 335 |
| Duality of invariant measures | p. 336 |
| Applications to Diophantine approximation | p. 338 |
| Polynomials in one variable | p. 338 |
| Values of linear forms | p. 338 |
| Diophantine approximation with dependent quantities | p. 339 |
| Values of quadratic forms | p. 340 |
| Forms of higher degree | p. 343 |
| Integral points on algebraic varieties | p. 343 |
| Classification and related questions | p. 344 |
| Metric isomorphisms and factors | p. 345 |
| Metric rigidity | p. 346 |
| Topological conjugacy | p. 347 |
| Topological equivalence | p. 349 |
| Bibliography | p. 350 |
| The Dynamics of Billiard Flowsin Rational Polygons | |
| The Dynamics of Billiard Flows in Rational Polygons of Dynamical Systems | p. 360 |
| Two Examples | p. 362 |
| Formal Properties of the Billiard Flow | p. 364 |
| The Flow in a Fixed Direction | p. 367 |
| Billiard Techniques: Minimality and Closed Orbits | p. 369 |
| Billiard Techniques: Unique Ergodicity | p. 372 |
| Dynamics on Moduli Spaces | p. 374 |
| The Lattice Examples of Veech | p. 377 |
| Bibliography | p. 380 |
| Dynamical Systems of Statistical Mechanicsand Kinetic Equations | |
| Dynamical Systems of Statistical Mechanics | p. 384 |
| Introduction | p. 384 |
| Phase Space of Systems of Statistical Mechanics and Gibbs Measures | p. 386 |
| The Configuration Space | p. 386 |
| Poisson Measures | p. 388 |
| The Gibbs Configuration Probability Distribution | p. 388 |
| Potential of the Pair Interaction. Existence and Uniqueness of a Gibbs Configuration Probability Distribution | p. 390 |
| The Phase Space. The Gibbs Probability Distribution | p. 393 |
| Gibbs Measures with a General Potential | p. 395 |
| The Moment Measure and Moment Function | p. 396 |
| Dynamics of a System of Interacting Particles | p. 398 |
| Statement of the Problem | p. 398 |
| Construction of the Dynamics and Time Evolution | p. 400 |
| Hierarchy of the Bogolyubov Equations | p. 402 |
| Equilibrium Dynamics | p. 403 |
| Definition and Construction of Equilibrium Dynamics | p. 403 |
| The Gibbs Postulate | p. 405 |
| Degenerate Models | p. 407 |
| Asymptotic Properties of the Measures Pt | p. 408 |
| Ideal Gas and Related Systems | p. 408 |
| The Poisson Superstructure | p. 408 |
| Asymptotic Behaviour of the Probability Distribution Pt as t → ∞ | p. 410 |
| The Dynamical System of One-Dimensional Hard Rods | p. 411 |
| Kinetic Equations | p. 412 |
| Statement of the Problem | p. 412 |
| The Boltzmann Equation | p. 415 |
| The Vlasov Equation | p. 419 |
| The Landau Equation | p. 420 |
| Hydrodynamic Equations | p. 421 |
| Bibliography | p. 423 |
| Existence and Uniqueness Theorems for the Boltzmann Equation | p. 430 |
| Formulation of Boundary Problems. Properties of Integral Operators | p. 430 |
| The Boltzmann Equation | p. 430 |
| Formulation of Boundary Problems | p. 434 |
| Properties of the Collision Integral | p. 435 |
| Linear Stationary Problems | p. 437 |
| Asymptotics | p. 437 |
| Internal Problems | p. 438 |
| External Problems | p. 439 |
| Kramers' Problem | p. 441 |
| Nonlinear Stationary Problems | p. 441 |
| Non-Stationary Problems | p. 443 |
| Table of Contents provided by Publisher. All Rights Reserved. |
