Dimension theory of hyperbolic flows
Barreira, Luis
Dimension theory of hyperbolic flows Luis Barreira - Cham ; New York : Springer, c2013. - x, 158 p. : ill. ; 25 cm. - Springer monographs in mathematics . - Springer monographs in mathematics .
Bibliografie p. 151
Index p.157
1. Introduction -- 2. Suspension flows -- 3. Hyperbolic flows -- 4. Pressure and dimension -- 5. Dimension of hyperbolic sets -- 6. Pointwise dimension and applications -- 7. Suspensions over symbolic dynamics -- 8. Multifractal analysis of hyperbolic flows -- 9. Entropy spectra -- 10. Multidimensional spectra -- 11. Dimension spectra.
The dimension theory of dynamical systems has progressively developed, especially over the last two decades, into an independent and extremely active field of research. Its main aim is to study the complexity of sets and measures that are invariant under the dynamics. In particular, it is essential to characterizing chaotic strange attractors. To date, some parts of the theory have either only been outlined, because they can be reduced to the case of maps, or are too technical for a wider audience. In this respect, the present monograph is intended to provide a comprehensive guide. Moreover, the text is self-contained and with the exception of some basic results in Chapters 3 and 4, all the results in the book include detailed proofs.The book is intended for researchers and graduate students specializing in dynamical systems who wish to have a sufficiently comprehensive view of the theory together with a working knowledge of its main techniques. The discussion of some open problems is also included in the hope that it may lead to further developments. Ideally, readers should have some familiarity with the basic notions and results of ergodic theory and hyperbolic dynamics at the level of an introductory course in the area, though the initial chapters also review all the necessary material --
eng
9783319005478 (alk. paper) 3319005472 (alk. paper) 9783319005485 (eISBN)
2013942381
Dimension theory (Algebra)
Differential equations, Hyperbolic
QA611.3
515.39
Dimension theory of hyperbolic flows Luis Barreira - Cham ; New York : Springer, c2013. - x, 158 p. : ill. ; 25 cm. - Springer monographs in mathematics . - Springer monographs in mathematics .
Bibliografie p. 151
Index p.157
1. Introduction -- 2. Suspension flows -- 3. Hyperbolic flows -- 4. Pressure and dimension -- 5. Dimension of hyperbolic sets -- 6. Pointwise dimension and applications -- 7. Suspensions over symbolic dynamics -- 8. Multifractal analysis of hyperbolic flows -- 9. Entropy spectra -- 10. Multidimensional spectra -- 11. Dimension spectra.
The dimension theory of dynamical systems has progressively developed, especially over the last two decades, into an independent and extremely active field of research. Its main aim is to study the complexity of sets and measures that are invariant under the dynamics. In particular, it is essential to characterizing chaotic strange attractors. To date, some parts of the theory have either only been outlined, because they can be reduced to the case of maps, or are too technical for a wider audience. In this respect, the present monograph is intended to provide a comprehensive guide. Moreover, the text is self-contained and with the exception of some basic results in Chapters 3 and 4, all the results in the book include detailed proofs.The book is intended for researchers and graduate students specializing in dynamical systems who wish to have a sufficiently comprehensive view of the theory together with a working knowledge of its main techniques. The discussion of some open problems is also included in the hope that it may lead to further developments. Ideally, readers should have some familiarity with the basic notions and results of ergodic theory and hyperbolic dynamics at the level of an introductory course in the area, though the initial chapters also review all the necessary material --
eng
9783319005478 (alk. paper) 3319005472 (alk. paper) 9783319005485 (eISBN)
2013942381
Dimension theory (Algebra)
Differential equations, Hyperbolic
QA611.3
515.39