Numerical Solution of Ordinary Differential Equations
(Sprache: Englisch)
This precise and highly readable book provides a complete and concise introduction to classical topics in the numerical solution of ordinary differential equations (ODEs). It contains many up to date references to both analytical and numerical ODE...
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Produktinformationen zu „Numerical Solution of Ordinary Differential Equations “
This precise and highly readable book provides a complete and concise introduction to classical topics in the numerical solution of ordinary differential equations (ODEs). It contains many up to date references to both analytical and numerical ODE literature while offering new unifying views on different problem classes.
Klappentext zu „Numerical Solution of Ordinary Differential Equations “
A concise introduction to numerical methodsand the mathematical framework neededto understand their performanceNumerical Solution of Ordinary Differential Equations presents a complete and easy-to-follow introduction to classical topics in the numerical solution of ordinary differential equations. The book's approach not only explains the presented mathematics, but also helps readers understand how these numerical methods are used to solve real-world problems.
Unifying perspectives are provided throughout the text, bringing together and categorizing different types of problems in order to help readers comprehend the applications of ordinary differential equations. In addition, the authors' collective academic experience ensures a coherent and accessible discussion of key topics, including:
* Euler's method
* Taylor and Runge-Kutta methods
* General error analysis for multi-step methods
* Stiff differential equations
* Differential algebraic equations
* Two-point boundary value problems
* Volterra integral equations
Each chapter features problem sets that enable readers to test and build their knowledge of the presented methods, and a related Web site features MATLAB(r) programs that facilitate the exploration of numerical methods in greater depth. Detailed references outline additional literature on both analytical and numerical aspects of ordinary differential equations for further exploration of individual topics.
Numerical Solution of Ordinary Differential Equations is an excellent textbook for courses on the numerical solution of differential equations at the upper-undergraduate and beginning graduate levels. It also serves as a valuable reference for researchers in the fields of mathematics and engineering.
A concise introduction to numerical methodsand the mathematical framework neededto understand their performance
Numerical Solution of Ordinary Differential Equations presents a complete and easy-to-follow introduction to classical topics in the numerical solution of ordinary differential equations. The book's approach not only explains the presented mathematics, but also helps readers understand how these numerical methods are used to solve real-world problems.
Unifying perspectives are provided throughout the text, bringing together and categorizing different types of problems in order to help readers comprehend the applications of ordinary differential equations. In addition, the authors' collective academic experience ensures a coherent and accessible discussion of key topics, including:
- Euler's method
- Taylor and Runge-Kutta methods
- General error analysis for multi-step methods
- Stiff differential equations
- Differential algebraic equations
- Two-point boundary value problems
- Volterra integral equations
Each chapter features problem sets that enable readers to test and build their knowledge of the presented methods, and a related Web site features MATLAB(r) programs that facilitate the exploration of numerical methods in greater depth. Detailed references outline additional literature on both analytical and numerical aspects of ordinary differential equations for further exploration of individual topics.
Numerical Solution of Ordinary Differential Equations is an excellent textbook for courses on the numerical solution of differential equations at the upper-undergraduate and beginning graduate levels. It also serves as a valuable reference for researchers in the fields of mathematics and engineering.
Numerical Solution of Ordinary Differential Equations presents a complete and easy-to-follow introduction to classical topics in the numerical solution of ordinary differential equations. The book's approach not only explains the presented mathematics, but also helps readers understand how these numerical methods are used to solve real-world problems.
Unifying perspectives are provided throughout the text, bringing together and categorizing different types of problems in order to help readers comprehend the applications of ordinary differential equations. In addition, the authors' collective academic experience ensures a coherent and accessible discussion of key topics, including:
- Euler's method
- Taylor and Runge-Kutta methods
- General error analysis for multi-step methods
- Stiff differential equations
- Differential algebraic equations
- Two-point boundary value problems
- Volterra integral equations
Each chapter features problem sets that enable readers to test and build their knowledge of the presented methods, and a related Web site features MATLAB(r) programs that facilitate the exploration of numerical methods in greater depth. Detailed references outline additional literature on both analytical and numerical aspects of ordinary differential equations for further exploration of individual topics.
Numerical Solution of Ordinary Differential Equations is an excellent textbook for courses on the numerical solution of differential equations at the upper-undergraduate and beginning graduate levels. It also serves as a valuable reference for researchers in the fields of mathematics and engineering.
Inhaltsverzeichnis zu „Numerical Solution of Ordinary Differential Equations “
PrefaceIntroduction
1. Theory of differential equations: an introduction
1.1 General solvability theory
1.2 Stability of the initial value problem
1.3 Direction fields
Problems
2. Euler's method
2.1 Euler's method
2.2 Error analysis of Euler's method
2.3 Asymptotic error analysis
2.3.1 Richardson extrapolation
2.4 Numerical stability
2.4.1 Rounding error accumulation
Problems
3. Systems of differential equations
3.1 Higher order differential equations
3.2 Numerical methods for systems
Problems
4. The backward Euler method and the trapezoidal method
4.1 The backward Euler method
4.2 The trapezoidal method
Problems
5. Taylor and Runge-Kutta methods
5.1 Taylor methods
5.2 Runge-Kutta methods
5.3 Convergence, stability, and asymptotic error
5.4 Runge-Kutta-Fehlberg methods
5.5 Matlab codes
5.6 Implicit Runge-Kutta methods
Problems
6. Multistep methods
6.1 Adams-Bashforth methods
6.2 Adams-Moulton methods
6.3 Computer codes
Problems
7. General error analysis for multistep methods
7.1 Truncation error
7.2 Convergence
7.3 A general error analysis
Problems
8. Stiff differential equations
8.1 The method of lines for a parabolic equation
8.2 Backward differentiation formulas
8.3 Stability regions for multistep methods
8.4 Additional sources of difficulty
8.5 Solving the finite difference method
8.6 Computer codes
Problems
9. Implicit RK methods for stiff differential equations
9.1 Families of implicit Runge-Kutta methods
9.2 Stability of Runge-Kutta methods
9.3 Order reduction
9.4 Runge-Kutta methods for stiff equations in practice
Problems
10. Differential algebraic equations
10.1 Initial conditions and drift
10.2 DAEs as stiff differential equations
10.3 Numerical issues: higher index problems
10.4 Backward differentiation methods for DAEs
10.5 Runge-Kutta methods for DAEs
10.6 Index three
... mehr
problems from mechanics
10.7 Higher index DAEs
Problems
11. Two-point boundary value problems
11.1 A finite difference method
11.2 Nonlinear two-point boundary value problems
Problems
12. Volterra integral equations
12.1 Solvability theory
12.2 Numerical methods
12.3 Numerical methods - Theory
Problems
Appendix A. Taylor's theorem
Appendix B. Polynomial interpolation
Bibliography
Index
10.7 Higher index DAEs
Problems
11. Two-point boundary value problems
11.1 A finite difference method
11.2 Nonlinear two-point boundary value problems
Problems
12. Volterra integral equations
12.1 Solvability theory
12.2 Numerical methods
12.3 Numerical methods - Theory
Problems
Appendix A. Taylor's theorem
Appendix B. Polynomial interpolation
Bibliography
Index
... weniger
Autoren-Porträt von Kendall Atkinson, Weimin Han, David E. Stewart
Kendall E. Atkinson, PhD, is Professor Emeritus in the Departments of Mathematics and Computer Science at the University of Iowa. He has authored books and journal articles in his areas of research interest, which include the numerical solution of integral equations and boundary integral equation methods. Weimin Han, PhD, is Professor in the Department of Mathematics at the University of Iowa, where he is also Director of the interdisciplinary PhD Program in Applied Mathematical and Computational Science. Dr. Han currently focuses his research on the numerical solution of partial differential equations. David E. Stewart, PhD, is Professor and Associate Chair in the Department of Mathematics at the University of Iowa, where he is also the departmental Director of Undergraduate Studies. Dr. Stewart's research interests include numerical analysis, computational models of mechanics, scientific computing, and optimization.
Bibliographische Angaben
- Autoren: Kendall Atkinson , Weimin Han , David E. Stewart
- 2009, 1. Auflage, 272 Seiten, Maße: 16,1 x 24 cm, Gebunden, Englisch
- Verlag: Wiley & Sons
- ISBN-10: 047004294X
- ISBN-13: 9780470042946
- Erscheinungsdatum: 13.03.2009
Sprache:
Englisch
Rezension zu „Numerical Solution of Ordinary Differential Equations “
"An accompanying Web site offers access to more than ten MATLAB programs." (CHOICE, December 2009)
Pressezitat
"An accompanying Web site offers access to more than ten MATLAB programs." (CHOICE, December 2009)
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