Asymptotology : ideas, methods, and applications
Author(s)
Bibliographic Information
Asymptotology : ideas, methods, and applications
(Mathematics and its applications, v. 551)
Kluwer Academic, c2002
- Uniform Title
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Asimptotologii︠a︡
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Note
Includes bibliographical references (p. 225-240) and index
Translated from the Russian
Description and Table of Contents
Description
Asymptotic methods belong to the, perhaps, most romantic area of modern mathematics. They are widely known and have been used in me chanics, physics and other exact sciences for many, many decades. But more than this, asymptotic ideas are found in all branches of human knowledge, indeed in all areas of life. In this broader context they have not and perhaps cannot be fully formalized. However, they are mar velous, they leave room for fantasy, guesses and intuition; they bring us very near to the border of the realm of art. Many books have been written and published about asymptotic meth ods. Most of them presume a mathematically sophisticated reader. The authors here attempt to describe asymptotic methods on a more accessi ble level, hoping to address a wider range of readers. They have avoided the extreme of banishing formulae entirely, as done in some popular science books that attempt to describe mathematical methods with no mathematics. This is impossible (and not wise). Rather, the authors have tried to keep the mathematics at a moderate level. At the same time, using simple examples, they think they have been able to illustrate all the key ideas of asymptotic methods and approaches, to depict in de tail the results of their application to various branches of knowledg- from astronomy, mechanics, and physics to biology, psychology and art. The book is supplemented by several appendices, one of which con tains the profound ideas of R. G.
Table of Contents
Foreword. Preface. Acknowledgments. Synopsis.
1. Introduction.
2. What Are Asymptotic Methods?
3. A Little Mathematics.
4. How Asymptotic Methods Work.
5. Asymptotic Methods and Physical Theories.
6. Phenomenology and First Principles.
7. A Little History.
8. Fathers of Asymptotic Methods.
9. Conclusion.
Appendices: A. Linear and Nonlinear Mathematical Physics: from Harmonic Waves to Solitons.
B. Certain Mathematical Notions of Catastrophe Theory.
C. Asymptotics and Scaling Transformations.
D. Asymptotic Approaches: Attempt af a Definition.
E. Some Web-pages.
References.
About the Authors. Author Index.
Topic Index.
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