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Scientific Computing with Ordinary Differential Equations / Edition 1

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ISBN-10:: 1441930116
ISBN-13:: 9781441930118
Pub. Date:: 12/03/2010
Publisher:: Springer New York

ISBN-10:: 1441930116
ISBN-13:: 9781441930118
Pub. Date:: 12/03/2010
Publisher:: Springer New York

Scientific Computing with Ordinary Differential Equations / Edition 1

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Overview

Mathematics is playing an ever more important role in the physical and biological sciences, provoking a blurring of boundaries between scientific disciplines and a resurgence of interest in the modern as well as the classical techniques of applied mathematics. This renewal of interest, both in research and teaching, has led to the establishment of the series Texts in Applied Mathematics (TAM). The development of new courses is a natural consequence of a high level of excitement on the research frontier as newer techniques, such as numeri cal and symbolic computer systems, dynamical systems, and chaos, mix with and reinforce the traditional methods of applied mathematics. Thus, the purpose of this textbook series is to meet the current and future needs of these advances and to encourage the teaching of new courses. TAM will publish textbooks suitable for use in advanced undergraduate and beginning graduate courses, and will complement the Applied Mathe matical Sciences (AMS) series, which will focus on advanced textbooks and research-level monographs.

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ISBN-13:	9781441930118
Publisher:	Springer New York
Publication date:	12/03/2010
Series:	Texts in Applied Mathematics , #42
Edition description:	Softcover reprint of the original 1st ed. 2002
Pages:	486
Product dimensions:	6.10(w) x 9.25(h) x 0.24(d)

1 Time-Dependent Processes in Science and Engineering.- 1.1 Newton’s Celestial Mechanics.- 1.2 Classical Molecular Dynamics.- 1.3 Chemical Reaction Kinetics.- 1.4 Electrical Circuits.- Exercises.- 2 Existence and Uniqueness for Initial Value Problems.- 2.1 Global Existence and Uniqueness.- 2.2 Examples of Maximal Continuation.- 2.3 Structure of Nonunique Solutions.- 2.4 Weakly Singular Initial Value Problems.- 2.5 Singular Perturbation Problems.- 2.6 Quasilinear Differential-Algebraic Problems.- Exercises.- 3 Condition of Initial Value Problems.- 3.1 Sensitivity Under Perturbations.- 3.2 Stability of ODEs.- 3.3 Stability of Recursive Mappings.- Exercises.- 4 One-Step Methods for Nonstiff IVPs.- 4.1 Convergence Theory.- 4.2 Explicit Runge-Kutta Methods.- 4.3 Explicit Extrapolation Methods.- 5 Adaptive Control of One-Step Methods.- 5.1 Local Accuracy Control.- 5.2 Control-Theoretic Analysis.- 5.3 Error Estimation.- 5.4 Embedded Runge-Kutta Methods.- 5.5 Local Versus Achieved Accuracy.- Exercises.- 6 One-Step Methods for Stiff ODE and DAE IVPs.- 6.1 Inheritance of Asymptotic Stability.- 6.2 Implicit Runge-Kutta Methods.- 6.3 Collocation Methods.- 6.4 Linearly Implicit One-Step Methods.- Exercises.- 7 MultiStep Methods for ODE and DAE IVPs.- 7.1 Multistep Methods on Equidistant Meshes.- 7.2 Inheritance of Asymptotic Stability.- 7.3 Direct Construction of Efficient Multistep Methods.- 7.4 Adaptive Control of Order and Step Size.- Exercises.- 8 Boundary Value Problems for ODEs.- 8.1 Sensitivity for Two-Point EVPs.- 8.2 Initial Value Methods for Timelike EVPs.- 8.3 Cyclic Systems of Linear Equations.- 8.4 Global Discretization Methods for Spacelike EVPs.- 8.5 More General Types of BVPs.- 8.6 Variational Problems.- Exercises.- References.- Software.

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Editorial Reviews

P. Deuflhard and F. Bornemann

Scientific Computing with Ordinary Differential Equations

"Provides a sound fundamental introduction to the mathematical and numerical aspects of discretization methods for solving initial value problems in ordinary differential equations . . . This book would make an interesting (non-conventional) textbook for a graduate course in numerical analysis of ODEs. It is written at a level which is accessible to such an audience, covers a wide variety of topics, both classical and modern, and contains a generous supply of homework exercises. In summary, this is an excellent and timely book."—MATHEMATICAL REVIEWS

"As indicated by the title, this is not a treatise merely on the numerical analysis of ordinary differential equations (ODEs). … the reader is made acquainted with nontrivial examples of ODEs arising in diverse areas and with intrinsic properties of these equations. … The consideration of all the various components … makes for a very informative reading which is further aided by the undogmatic style of presentation. The volume can be recommended to newcomers, but also to instructors in this area." (H. Muthsam, Monatshefte für Mathematik, Vol. 143 (1), 2004)

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