MTH 452- 552 : NUMERICAL SOLUTION OF ORDINARY DIFFERENTIAL EQUATIONS - Winter 2013
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Instructor: Malgorzata Peszynska
Class: MWF 10:00-10:50 Rogers 440

Course information: Credits: 3.00.
Student preparation: Students should have a good background in differential equations (for example, at least MTH 256 or equivalent). Familiarity with (some) numerical methods, algorithms, some programming language, and in particular with MATLAB is a plus; however, I will develop the basics as necessary. Most students will have taken 451/551 prior to this course but this is not mandatory: please contact me if you have questions.
Syllabus: In the course we will cover numerical methods for Initial Value Problems (IVPs) and in particular:
  • Review of solving differential equations.
  • Difference methods for IVP including one- and multi-step methods, explicit and implicit methods. predictor-corrector methods, and more. You will become familiar with methods associated with names of Euler, Runge-Kutta, Adams-Bashforth, Adams-Moulton.
  • Properties of numerical methods for IVP: their stability, consistence, rate of convergence, and cost. You will understand the dilemma between accuracy and efficiency.
  • Examples of relevant ODEs from applications in mechanics, chemistry, biology, and geosciences. You will get computational experience in solving them numerically and enjoy discovering their properties using numerical experiments.
Additional topics may include introductory material on BVP (boundary value problems).

Exams: There will be a Midterm in class Monday, 2/11, and a Final Exam on Wed, 3/20, at 9:30am.
Grading: Homework will count as 40% of the grade, exams as 30% each. Problems for extra credit (for the total up to 10%) can/will be assigned individually throughout the term for those interested.

Textbook:

Finite Difference Methods for Ordinary and Partial Differential Equations, Steady State and Time Dependent Problems by Randall J. LeVeque, SIAM, 2007. Paperback: ISBN 978-0-898716-29-0
Exercises and m-files to accompany the book


Enrichment material from other sources will be used.
MATLAB materials: there exist plenty of good resources for MATLAB, some available online (search, for example, for "matlab tutorial free"). See also this worksheet lab.txt .


Course Outcomes: A successful student will be able to
  • Understand, analyze, and implement basic finite difference schemes for ordinary differential equations
  • Determine stability and accuracy of an algorithm theoretically and experimentally
  • Propose an appropriate method for IVP in a given application

Special arrangements for students with disabilities, make-up exams etc.: please contact the instructor and Services for Students with Disabilities, if relevant, and provide appropriate documentation.
Course drop/add information is at http://oregonstate.edu/registrar/.