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Book Categories |
| Introduction | ||
| Ergodic Ramsey Theory | 1 | |
| Flows on homogeneous spaces | 63 | |
| The variational principle for Hausdorff dimension | 113 | |
| Boundaries of invariant Markov Operators: The identification problem | 127 | |
| Squaring and cubing the circle - Rudolph's theorem | 177 | |
| A survey of recent K-theoretic invariants for dynamical systems | 185 | |
| Miles of Tiles | 237 | |
| Overlapping cylinders: the size of a dynamically defined Cantor-set | 259 | |
| Uniformity in the polynomial Szemerdi theorem | 273 | |
| Some 2-d symbolic dynamical systems: Entropy and mixing | 297 | |
| A note on certain rigid subshifts | 307 | |
| Entropy of graphs, semigroups and groups | 319 | |
| On representation of integers in Linear Numeration Systems | 345 | |
| The structure of ergodic transformations conjugate to their inverses | 369 | |
| Approximation by periodic transformations and diophantine approximation of the spectrum | 387 | |
| Invariant [sigma]-algebras for Z[superscript d]-actions and their applications | 403 | |
| Large deviations for paths and configurations counting | 415 | |
| A zeta function for Z[superscript d]-actions | 433 | |
| The dynamical theory of tilings and Quasicrystallography | 451 | |
| Approximations of groups and group actions, Cayley topology | 475 |
| Price | Condition | Delivery | Seller | Action |
| $118.08 | Digital |
| WonderClub |
Daniel tepper
reviewed Ergodic Theory and Z(d) Actions on November 20, 2016
Ergodic Theory and Z
I had studied the entirety of this textbook over the course of two university semesters. The textbook serves as a simple introduction, and delves unhurriedly and systemically into more advanced theories. A student will find an abundance of exercises to work through, and an adequate number of solved examples for almost each concept you come across in the chapters. As a bonus, I have absolutely enjoyed the case studies and articles included.
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Add Ergodic Theory and Z(d) Actions, The classical theory of dynamical systems has tended to concentrate on Z-actions or R-actions. In recent years, however, there has been considerable progress in the study of higher dimensional actions (i.e. Zd or Rd with d>1). This book represents the , Ergodic Theory and Z(d) Actions to the inventory that you are selling on WonderClubX
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Add Ergodic Theory and Z(d) Actions, The classical theory of dynamical systems has tended to concentrate on Z-actions or R-actions. In recent years, however, there has been considerable progress in the study of higher dimensional actions (i.e. Zd or Rd with d>1). This book represents the , Ergodic Theory and Z(d) Actions to your collection on WonderClub |
