Stability and Bifurcation Theory for Non-Autonomous Differential Equations [electronic resource] :Cetraro, Italy 2011, Editors: Russell Johnson, Maria Patrizia Pera /
by Capietto, Anna [author.]; Kloeden, Peter [author.]; Mawhin, Jean [author.]; Novo, Sylvia [author.]; Ortega, Rafael [author.]; SpringerLink (Online service).Material type: BookSeries: Lecture Notes in Mathematics: 2065Publisher: Berlin, Heidelberg : Springer Berlin Heidelberg : 2013.Description: IX, 303 p. 26 illus., 9 illus. in color. online resource.ISBN: 9783642329067.Subject(s): Mathematics | Functional equations | Differentiable dynamical systems | Differential Equations | Mathematics | Ordinary Differential Equations | Difference and Functional Equations | Dynamical Systems and Ergodic TheoryDDC classification: 515.352 Online resources: Click here to access online
|Item type||Current location||Call number||Status||Date due||Barcode|
Central Library, IISER Bhopal
OPAC URL: http://webopac.iiserb.ac.in/
|515.352 (Browse shelf)||Not for loan|
The Maslov index and global bifurcation for nonlinear boundary value problems -- Discrete-time nonautonomous dynamical systems -- Resonance problems for some non-autonomous ordinary differential equations -- Non-autonomous functional differential equations and applications -- Twist mappings with non-periodic angles.
This volume contains the notes from five lecture courses devoted to nonautonomous differential systems, in which appropriate topological and dynamical techniques were described and applied to a variety of problems. The courses took place during the C.I.M.E. Session "Stability and Bifurcation Problems for Non-Autonomous Differential Equations," held in Cetraro, Italy, June 19-25 2011. Anna Capietto and Jean Mawhin lectured on nonlinear boundary value problems; they applied the Maslov index and degree-theoretic methods in this context. Rafael Ortega discussed the theory of twist maps with nonperiodic phase and presented applications. Peter Kloeden and Sylvia Novo showed how dynamical methods can be used to study the stability/bifurcation properties of bounded solutions and of attracting sets for nonautonomous differential and functional-differential equations. The volume will be of interest to all researchers working in these and related fields.