000 | 00385nam a2200145Ia 4500 | ||
---|---|---|---|
999 |
_c179847 _d179847 |
||
020 | _a0444521895 | ||
040 | _cCUS | ||
082 |
_a514.742 _bAFR/F |
||
245 | 0 |
_aFractal Dimensions for Poincare Recurrences,/ _cAfraimovich,Valentin |
|
250 | _a1 | ||
260 |
_aAmsterdam: _bElsevier Science, _c2006-. |
||
300 | _a258 | ||
505 | _a 1. Introduction Part 1: Fundamentals 2. Symbolic Systems3. Geometric Constructions4. Spectrum of Dimensions for Recurrences Part II: Zero-Dimensional Invariant Sets 5. Uniformly Hyperbolic Repellers6. Non-Uniformly Hyperbolic Repellers7. The Spectrum for a Sticky Set8. Rhythmical Dynamics Part III: One-Dimensional Systems 9. Markov Maps of the Interval10. Suspended Flows Part IV: Measure Theoretical Results 11. Invariant Measures12. Dimensional for Measures13. The Variational Principle Part V: Physical Interpretation and Applications 14. Intuitive Explanation15. Hamiltonian Systems16. Chaos Synchronization Part VI: Appendices 17. Some Known Facts About Recurrences18. Birkhoff's Individual Theorem19. The SMB Theorem20. Amalgamation and Fragmentation Index | ||
942 | _cAC8 |