Introduction to Perturbation MethodsSpringer Science & Business Media, 5 dic 2012 - 438 páginas This introductory graduate text is based on a graduate course the author has taught repeatedly over the last ten years to students in applied mathematics, engineering sciences, and physics. Each chapter begins with an introductory development involving ordinary differential equations, and goes on to cover such traditional topics as boundary layers and multiple scales. However, it also contains material arising from current research interest, including homogenisation, slender body theory, symbolic computing, and discrete equations. Many of the excellent exercises are derived from problems of up-to-date research and are drawn from a wide range of application areas. One hundred new pages added including new material on transcedentally small terms, Kummer's function, weakly coupled oscillators and wave interactions. |
Índice
| 1 | |
Chapter 2 Matched Asymptotic Expansions | 57 |
Chapter 3 Multiple Scales | 139 |
Chapter 4 The WKB and Related Methods | 222 |
Chapter 5 The Method of Homogenization | 297 |
Chapter 6 Introduction to Bifurcation and Stability | 325 |
Appendix A Taylor Series | 393 |
Appendix B Solution and Properties of Transition Layer Equations | 397 |
Appendix C Asymptotic Approximations of Integrals | 407 |
Apprendix D SecondOrder Difference Equations | 411 |
Appendix E Delay Equations | 415 |
| 420 | |
| 433 | |