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The basin of attraction of an equilibrium of an ordinary differential equation can be determined using a Lyapunov function. A new method to construct such a Lyapunov function using radial basis functions is presented in this volume intended for researchers and advanced students from both dynamical systems and radial basis functions. Besides an introduction to both areas and a detailed description of the method, it contains error estimates and many examples.

Produktbeschreibung
The basin of attraction of an equilibrium of an ordinary differential equation can be determined using a Lyapunov function. A new method to construct such a Lyapunov function using radial basis functions is presented in this volume intended for researchers and advanced students from both dynamical systems and radial basis functions. Besides an introduction to both areas and a detailed description of the method, it contains error estimates and many examples.


Dieser Download kann aus rechtlichen Gründen nur mit Rechnungsadresse in A, B, BG, CY, CZ, D, DK, EW, E, FIN, F, GR, HR, H, IRL, I, LT, L, LR, M, NL, PL, P, R, S, SLO, SK ausgeliefert werden.

Autorenporträt
Peter Giesl, University of Technology München, Germany
Rezensionen
From the reviews:

"In this book the author presents a new method to construct such a Lyapunov function using radial basis functions. Besides an introduction to both areas and a detailed description of the method, it contains error estimates and a lot of examples. This book is intended for researchers and advanced students from both dynamical systems and radial basis functions." (Alexander O. Ignatyev, Zentralblatt MATH, Vol. 1121 (23), 2007)

"In the monograph under review a method for the numerical computation of Lyapunov functions is developed. ... one cannot only learn about how to compute Lyapunov functions, but can in fact learn a lot about their theoretical properties and about approximation methods using radial basis functions. ... In summary, the book can be strongly recommended to anyone interested in either Lyapunov functions or in approximation methods using radial basis functions ... . it is also very suitable for self study." (Lars Grüne, Mathematical Reviews, Issue 2009 i)