Handbook of Dynamical SystemsB. Hasselblatt, A. Katok Elsevier, 20 août 2002 - 1232 pages Volumes 1A and 1B.
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Table des matières
Chapter 2 Entropy isomorphism and equivalence in ergodic theory | 205 |
Chapter 3 Hyperbolic dynamical systems | 239 |
Chapter 4 Invariant measures for hyperbolic dynamical systems | 321 |
Chapter 5 Periodic orbits and zeta functions | 409 |
Chapter 6 Hyperbolic dynamics and Riemannian geometry | 453 |
Chapter 7 Topological methods in dynamics | 547 |
Chapter 8 Onedimensional maps | 599 |
Chapter 9 Ergodic theory and dynamics of Gspaces with special emphasis on rigidity phenomena | 665 |
Chapter 11 Dynamics of subgroup actions on homogeneous spaces of Lie groups and applications to number theory | 813 |
Chapter 12 Random walks on groups and random transformations | 931 |
Chapter 13 Rational billiards and flat structures | 1015 |
Chapter 14 Variational methods for Hamiltonian systems | 1091 |
Chapter 15 Pseudoholomorphic curves and dynamics in three dimensions | 1129 |
1189 | |
1203 | |
Chapter 10 Symbolic and algebraic dynamical systems | 765 |
Autres éditions - Tout afficher
Handbook of Dynamical Systems, Volume 1,Partie 1 B. Hasselblatt,A. Katok Aucun aperçu disponible - 2002 |
Expressions et termes fréquents
action algebraic Anosov apply assume behavior boundary bounded called closed cocycle compact complete condition conjugate connected consider constant construction contains continuous COROLLARY corresponding curvature defined definition denote described diffeomorphisms differentiable dimension discrete dynamical systems elements entropy equivalent Ergodic Theory example exists fact factor finite flow foliations function geodesic flow Gibbs measures given gives hence holds homeomorphism homogeneous hyperbolic implies important interval invariant measure isomorphic lattice Lemma Lie group limit linear locally manifold Markov Math maximal metric minimal mixing natural negative neighborhood Note obtain orbit particular partition positive preserving probability measure proof properties Proposition proved regularity REMARK representation respect result rigidity satisfies sequence shift situation smooth space stable structure subgroup subset Suppose Theorem topological transformation transitive unique unstable vector volume