The Computable Differential Equation Lecture ... - Bruce E. Shapiro

21.04.2015 Views
198 CHAPTER 10. APPENDIX ON ANALYTIC METHODS (MATH 280 IN A NUTSHELL) Math 582B, Spring 2007 California State University Northridge c○2007, B.E.Shapiro Last revised: May 23, 2007

Bibliography [1] Ascher, Uri M., Mattheij, Robert M. M., and Russell, Robert D. (1995) Numerical Solution of Boundary Value Problems for Ordinary Differential Equations. SIAM. [2] Ascher, Uri M, and Petzold, Linda R. (1998) Computer Methods for Ordinary Differential Equations and Differenatial-Algebraic Equations. SIAM. [3] Bellen, Alfredo, and Zennaro, Marino (2003)Numerical Methods for Delay Differential Equations. Oxford. [4] Boyce, William E., and Diprima, Richard C. (2004) Elementary Differential Equations. Wiley. [5] Brenan, K.E., Campbell, S.L., and Petzold, L.R. (1996) Numerical Solution of Initial-Value Problems in Differential-Algebraic Equations SIAM. [6] Burden, Richard L., and Faires, J. Douglas (2001) Numerical Analysis, 7th Edition. Brooks/Cole. [7] Butcher, J.C. (2003)Numerical Methods for Ordinary Differential Equations. Wiley. [8] Driver, Rodney D. (1978) Introduction to Ordinary Differential Equations. Harper and Row. [9] Gear, G. William (1971) Numerical Initial Value Problems in Ordinary Differnetial Equations. Prentice-Hall. [10] Hairer, E, Norsett, S. P, and Wanner, G. (1987) Solving Ordinary Differential Equation I: Nonstiff Problems. Springer-Verlag. [11] Hairer, E. and Wanner, G. (2005) Solving Ordinary Differential Equations II: Stiff and Differential Algebraic Problems. Second Edition. Springer-Verlag. [12] Hurewicz, Witold (1990) Lectures on Ordinary Differential Equations. Dover. Reprint of 1958 MIT Press Edition. 199

Page 1 and 2: The Computable Differential Equatio

Page 3 and 4: Contents 1 Classifying The Problem

Page 5 and 6: CONTENTS v Timeline on Computable D

Page 7 and 8: Chapter 1 Classifying The Problem 1

Page 9 and 10: CHAPTER 1. CLASSIFYING THE PROBLEM











Page 31 and 32: Chapter 2 Successive Approximations

Page 33 and 34: CHAPTER 2. SUCCESSIVE APPROXIMATION








Page 49 and 50: Chapter 3 Approximate Solutions 3.1

Page 51 and 52: CHAPTER 3. APPROXIMATE SOLUTIONS 45












Page 75 and 76: Chapter 4 Improving on Euler’s Me

Page 77 and 78: CHAPTER 4. IMPROVING ON EULER’S M









Page 95 and 96: Chapter 5 Runge-Kutta Methods 5.1 T

Page 97 and 98: CHAPTER 5. RUNGE-KUTTA METHODS 91 w

Page 99 and 100: CHAPTER 5. RUNGE-KUTTA METHODS 93 w

Page 101 and 102: CHAPTER 5. RUNGE-KUTTA METHODS 95 5

Page 103 and 104: CHAPTER 5. RUNGE-KUTTA METHODS 97 F

Page 105 and 106: CHAPTER 5. RUNGE-KUTTA METHODS 99 T

Page 107 and 108: CHAPTER 5. RUNGE-KUTTA METHODS 101








Page 123 and 124: Chapter 6 Linear Multistep Methods

Page 125 and 126: CHAPTER 6. LINEAR MULTISTEP METHODS








Page 141 and 142: Chapter 7 Delay Differential Equati

Page 143 and 144: CHAPTER 7. DELAY DIFFERENTIAL EQUAT








Page 159 and 160: Chapter 8 Boundary Value Problems 8

Page 161 and 162: CHAPTER 8. BOUNDARY VALUE PROBLEMS






Page 173 and 174: Chapter 9 Differential Algebraic Eq

Page 175 and 176: CHAPTER 9. DIFFERENTIAL ALGEBRAIC E












Page 199 and 200: Chapter 10 Appendix on Analytic Met

Page 201 and 202: CHAPTER 10. APPENDIX ON ANALYTIC ME

Page 203: CHAPTER 10. APPENDIX ON ANALYTIC ME

method

equation

northridge

methods

differential

theorem

equations

linear

hence

initial

computable

shapiro

bruce-shapiro.com

The Computable Differential Equation Lecture ... - Bruce E. Shapiro

The Computable Differential Equation Lecture ... - Bruce E. Shapiro ... View more The Computable Differential Equation Lecture ... - Bruce E. Shapiro

Delete template?

Save as template ?

The Computable Differential Equation Lecture ... - Bruce E. Shapiro The Computable Differential Equation Lecture ... - Bruce E. Shapiro