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Viser: Finite Difference Methods for Ordinary and Partial Differential Equations - Steady-State and Time-Dependent Problems
Finite Difference Methods for Ordinary and Partial Differential Equations
Steady-State and Time-Dependent Problems
Randall J. LeVeque
(2007)
Sprog: Engelsk
om ca. 15 hverdage
Detaljer om varen
- Paperback: 354 sider
- Udgiver: Society for Industrial and Applied Mathematics (Juli 2007)
- ISBN: 9780898716290
The book is organized into two main sections and a set of appendices. Part I addresses steady-state boundary value problems, starting with two-point boundary value problems in one dimension, followed by coverage of elliptic problems in two and three dimensions. It concludes with a chapter on iterative methods for large sparse linear systems that emphasizes systems arising from difference approximations. Part II addresses time-dependent problems, starting with the initial value problem for ODEs, moving on to initial boundary value problems for parabolic and hyperbolic PDEs, and concluding with a chapter on mixed equations combining features of ODEs, parabolic equations, and hyperbolic equations. The appendices cover concepts pertinent to Parts I and II. Exercises and student projects, developed in conjunction with this book, are available on the book's webpage along with numerous MATLAB m-files.
Readers will gain an understanding of the essential ideas that underlie the development, analysis, and practical use of finite difference methods as well as the key concepts of stability theory, their relation to one another, and their practical implications. The author provides a foundation from which students can approach more advanced topics and further explore the theory and/or use of finite difference methods according to their interests and needs.
Part I: Boundary Value Problems and Iterative Methods.
Chapter 1: Finite Difference Approximations
Chapter 2: Steady States and Boundary Value Problems
Chapter 3: Elliptic Equations
Chapter 4: Iterative Methods for Sparse Linear Systems Part II: Initial Value Problems.
Chapter 5: The Initial Value Problem for Ordinary Differential Equations
Chapter 6: Zero-Stability and Convergence for Initial Value Problems
Chapter 7: Absolute Stability for Ordinary Differential Equations
Chapter 8: Stiff Ordinary Differential Equations
Chapter 9: Diffusion Equations and Parabolic Problems
Chapter 10: Advection Equations and Hyperbolic Systems
Chapter 11: Mixed Equations
Appendix A: Measuring Errors
Appendix B: Polynomial Interpolation and Orthogonal Polynomials
Appendix C: Eigenvalues and Inner-Product Norms
Appendix D: Matrix Powers and Exponentials
Appendix E: Partial Differential Equations Bibliography
Index.