Real-world systems that involve some non-smooth change are often well-modeled by piecewise-smooth systems. However there still remain many gaps in the mathematical theory of such systems. This doctoral thesis presents new results regarding bifurcations of piecewise-smooth, continuous, autonomous systems of ordinary differential equations and maps. Various codimension-two, discontinuity induced bifurcations are unfolded in a rigorous manner. Several of these unfoldings are applied to a mathematical model of the growth of Saccharomyces cerevisiae (a common yeast). The nature of resonance near border-collision bifurcations is described; in particular, the curious geometry of resonance tongues in piecewise-smooth continuous maps is explained in detail. Neimark?Sacker-like border-collision bifurcations are both numerically and theoretically investigated. A comprehensive background section is conveniently provided for those with little or no experience in piecewise-smooth systems.
| ISBN-13: | 9789814293846 |
| ISBN-10: | 9814293849 |
| Publisher: | World Scientific |
| Publication date: | 2010 |
| Edition description: | Illustrated |
| Pages: | 238 |
| Product dimensions: | Height: 9 Inches, Length: 6 Inches, Weight: 1 Pounds, Width: 0.6 Inches |
| Author: | David John Warwick Simpson |
| Language: | en |
| Binding: | Paperback |
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