Poincaré-Andronov-Melnikov Analysis for Non-Smooth Systems
Autor Michal Feckan, Michal Pospíšilen Limba Engleză Hardback – 17 mai 2016
The relationship between non-smooth systems and their continuous approximations is investigated as well. Examples of 2-, 3- and 4-dimensional discontinuous ordinary differential equations and impact systems are given to illustrate the theoretical results. The authors use so-called discontinuous Poincaré mapping which maps a point to its position after one period of the periodic solution. This approach is rather technical, but it does produce results for general dimensions of spatial variables and parameters as well as the asymptotical results such as stability, instability, and hyperbolicity.
- Extends Melnikov analysis of the classic Poincaré and Andronov staples, pointing to a general theory for freedom in dimensions of spatial variables and parameters as well as asymptotical results such as stability, instability, and hyperbolicity
- Presents a toolbox of critical theoretical techniques for many practical examples and models, including non-smooth dynamical systems
- Provides realistic models based on unsolved discontinuous problems from the literature and describes how Poincaré-Andronov-Melnikov analysis can be used to solve them
- Investigates the relationship between non-smooth systems and their continuous approximations
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Specificații
ISBN-13: 9780128042946
ISBN-10: 012804294X
Pagini: 260
Dimensiuni: 191 x 235 x 27 mm
Greutate: 0.67 kg
Editura: ELSEVIER SCIENCE
ISBN-10: 012804294X
Pagini: 260
Dimensiuni: 191 x 235 x 27 mm
Greutate: 0.67 kg
Editura: ELSEVIER SCIENCE
Cuprins
An introductory example
I. Piecewise-smooth systems of forced ODEs
I.2. Bifurcation from family of periodic orbits in autonomous systems
I.3. Bifurcation from single periodic orbit in autonomous systems
I.4. Sliding solution of periodically perturbed systems
I.5. Weakly coupled oscillators
Reference
II. Forced hybrid systems
II.1. Periodically forced impact systems
II.2. Bifurcation from family of periodic orbits in forced billiards
Reference
III. Continuous approximations of non-smooth systems
III.1. Transversal periodic orbits
III.2. Sliding periodic orbits
III.3. Impact periodic orbits
III.4. Approximation and dynamics
Reference
Appendix
I. Piecewise-smooth systems of forced ODEs
I.2. Bifurcation from family of periodic orbits in autonomous systems
I.3. Bifurcation from single periodic orbit in autonomous systems
I.4. Sliding solution of periodically perturbed systems
I.5. Weakly coupled oscillators
Reference
II. Forced hybrid systems
II.1. Periodically forced impact systems
II.2. Bifurcation from family of periodic orbits in forced billiards
Reference
III. Continuous approximations of non-smooth systems
III.1. Transversal periodic orbits
III.2. Sliding periodic orbits
III.3. Impact periodic orbits
III.4. Approximation and dynamics
Reference
Appendix