Asymptotic methods in mechanics of solids
Author(s)
Bibliographic Information
Asymptotic methods in mechanics of solids
(International series of numerical mathematics, v. 167)
Birkhäuser , Springer, c2015
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
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Note
Based on the Russian version: Асимптотические методы в механике твердого тела, R&C Dynamics, c2007
Other authors: Sergei B. Filippov, Andrei L. Smirnov, Petr E. Tovstik, Rémi Vaillancourt
Includes bibliographical references (p. 319-321) and index
Description and Table of Contents
Description
The construction of solutions of singularly perturbed systems of equations and boundary value problems that are characteristic for the mechanics of thin-walled structures are the main focus of the book. The theoretical results are supplemented by the analysis of problems and exercises. Some of the topics are rarely discussed in the textbooks, for example, the Newton polyhedron, which is a generalization of the Newton polygon for equations with two or more parameters. After introducing the important concept of the index of variation for functions special attention is devoted to eigenvalue problems containing a small parameter. The main part of the book deals with methods of asymptotic solutions of linear singularly perturbed boundary and boundary value problems without or with turning points, respectively. As examples, one-dimensional equilibrium, dynamics and stability problems for rigid bodies and solids are presented in detail. Numerous exercises and examples as well as vast references to the relevant Russian literature not well known for an English speaking reader makes this a indispensable textbook on the topic.
Table of Contents
Asymptotic Estimates.- Asymptotic Estimates for Integrals.- Regular Perturbation of ODE's.- Singularly Perturbed Linear ODE's.- Linear ODE's with Turning Points.- Asymptotic Integration of Nonlinear ODE's.- Bibliography.- Index.
by "Nielsen BookData"