METR 5344 CFD Course Home Page (Fall 2003)
Instructor: Dr. Ming Xue
mxue@ou.edu
SEC Room 1158
Tel: 325 6037
http://twister.ou.edu
Lecture Time: MWF 10:30-11:20 am
Location: Energy Center, 1410
Office Hours: Tuesday and Thursday 1-2:30pm or by appointment
Location: SEC 1158
We will also use Blackboard for grade posting etc.
The address is http://ou.blackboard.com
(Note: Many of the lecture materials are in the Adobe Acrobat
(PDF) format this site. If you don't have Acrobat
Reader, you can download it free from http://www.adobe.com).
Chapter 0. Introduction to CFD and Computing
Chapter 1. Foundamentals of Partial Differential Equations
Chapter 2. Finite Difference Method
2.1. Introduction
2.2. Methods for Obtaining FD Expressions
Tremback et al (1987 MWR) -
an example of using interpolation and polynomial fitting to construct
high-order advection scheme.
2.3. Quantitative Properties of FD Schemes. Lecture notes Part
A, Part B
2.4. Multi-Dimensional Problems
Term Project.
First Hour Exam Date: September 29th. Answer,
Grade Distribution.
Homework #3.
ARPS
Mini Tutorial
Homework #4.
Chapter 3. Finite Difference Methods for Hyperbolic Equations
3.1. Introduction
3.2. Linear convection – 1-D wave equation
Notes for 3.1 and 3.2.
3.3. Phase and Amplitude Errors of 1-D
Advection Equation
3.4. Monotonicity of Advection Schemes
3.5. Multi-Dimensional Advection (see link to 3.4)
Homework #5
Second Exam Date: Friday, November 7th.
Second Exam
Chapter 4. Nonlinear Hyperbolic Problems
4.1. Introduction
4.2. Nonlinear Instability
4.3. Controlling Nonlinear Instability
Review for exam 2.
Grade distribution: One 100, one 99, two 70, the rest between 80
and 85.
4.4 System of Hyperbolic Equations
- Shallow Water Equation model
4.5. Boundary Conditions for Hyperbolic
Equations
Chapter 5. Methods for Elliptic Equations
Chapter 6. Introduction to Semi-Lagrangian Methods
Chapter 7. Introduction to Spectral Methods
- Lecture Notes
- Durran book Chapter 4
- Temperton (2000)
on future of spectral method for ECMWF model
- Cullen et al (2000) on key issuess
for future development of ECMWF model
Presentation Schedule:
Wednesday, Dec 3, Tanamachi, Segele, Loftus
Friday, Dec 5, Liu, Groves, Godfrey
Monday, Dec 8, Fiebrich, Dawson, Adams
- Review for Exam 3.
|