Check nearby libraries
Buy this book
The main topic of this book is the theory of bifurcations of vector fields, i.e. the study of families of vector fields depending on one or several parameters and the changes (bifurcations) in the topological character of the objects studied as parameters vary. In particular, one of the phenomena studied is the bifurcation of periodic orbits from a singular point or a polycycle. The following topics are discussed in the book: Divergent series and resummation techniques with applications, in particular to the proofs of the finiteness conjecture of Dulac saying that polynomial vector fields on R2 cannot possess an infinity of limit cycles. The proofs work in the more general context of real analytic vector fields on the plane. Techniques in the study of unfoldings of singularities of vector fields (blowing up, normal forms, desingularization of vector fields). Local dynamics and nonlocal bifurcations. Knots and orbit genealogies in three-dimensional flows. Bifurcations and applications: computational studies of vector fields. Holomorphic differential equations in dimension two. Studies of real and complex polynomial systems and of the complex foliations arising from polynomial differential equations. Applications of computer algebra to dynamical systems.
Check nearby libraries
Buy this book
Previews available in: English
Subjects
Differential Equations, Functions of complex variables, Geometry, Electronic data processing, Sequences (Mathematics), Mathematics, Global analysis, Bifurcation theory, Ordinary Differential Equations, Global Analysis and Analysis on Manifolds, Sequences, Series, Summability, Numeric ComputingEdition | Availability |
---|---|
1
Bifurcations and Periodic Orbits of Vector Fields
Dec 05, 2012, Springer
paperback
9401582394 9789401582391
|
zzzz
|
2
Bifurcations and Periodic Orbits of Vector Fields
1993, Springer Netherlands
electronic resource /
in English
9048143039 9789048143030
|
aaaa
|
Book Details
Edition Notes
Online full text is restricted to subscribers.
Also available in print.
Mode of access: World Wide Web.
Classifications
The Physical Object
ID Numbers
Community Reviews (0)
Feedback?September 28, 2024 | Edited by MARC Bot | import existing book |
October 4, 2021 | Edited by ImportBot | import existing book |
June 28, 2019 | Created by MARC Bot | import new book |