Coexistence and Persistence of Strange Attractors / Lecture Notes in Mathematics Bd.1658 (PDF)

Name: Coexistence and Persistence of Strange Attractors / Lecture Notes in Mathematics Bd.1658
Brand: Springer Berlin Heidelberg
SKU: 105008709
Price: 41.11 EUR
Availability: OnlineOnly

(Sprache: Englisch)

Autoren: Antonio Pumarino , Angel J. Rodriguez

Schreiben Sie einen Kommentar zu "Coexistence and Persistence of Strange Attractors / Lecture Notes in Mathematics Bd.1658".

Coexistence and Persistence of Strange Attractors / Lecture Notes in Mathematics Bd.1658, Antonio Pumarino, Angel J. Rodriguez

Merken

Mehr zum Inhalt Video

sofort als Download lieferbar

Bestellnummer: 105008709

eBook (pdf) 41.11 €

Download bestellen

Verschenken

Lastschrift, Kreditkarte, Paypal, Rechnung
Kostenloser tolino webreader

Produktdetails

Produktbeschreibung
eBook Hilfe
Biblio. Angaben / Produktdetails

Produktinformationen zu „Coexistence and Persistence of Strange Attractors / Lecture Notes in Mathematics Bd.1658 (PDF)“

Although chaotic behaviour had often been observed numerically earlier, the first mathematical proof of the existence, with positive probability (persistence) of strange attractors was given by Benedicks and Carleson for the Henon family, at the beginning of 1990's. Later, Mora and Viana demonstrated that a strange attractor is also persistent in generic one-parameter families of diffeomorphims on a surface which unfolds homoclinic tangency. This book is about the persistence of any number of strange attractors in saddle-focus connections. The coexistence and persistence of any number of strange attractors in a simple three-dimensional scenario are proved, as well as the fact that infinitely many of them exist simultaneously. TOC:Contents: Introduction.- Saddle-focus connections.- The unimodal family.- Contractive directions.- Critical points of the bidimensional map.- The inductive process.- The binding point.- The binding period.- The exclusion of parameters.- Numerical experiments.