Overview
MATH5305 is an honours and postgraduate coursework Mathematics course
Partial differential equations (PDEs) provide a natural mathematical description for many phenomena of interest in science and engineering. Such equations are often difficult or impossible to solve using purely analytical (pencil and paper) methods, especially for realistic industrial problems. This course introduces finite difference and finite element methods for elliptic and parabolic PDEs, and discusses key concepts such as stability, convergence and computational cost. Relevant techniques in numerical linear algebra are also discussed.
The course includes a substantial practical component dealing with the computer implementation of the algorithms used for solving partial differential equations.
Note: Students must have some prior experience with computer programming.
Units of credit:听6
Exclusion:聽MATH3101 (jointly taught with MATH5305), MATH3301
Cycle of offering:聽Term 2
Graduate attributes:聽The course will enhance your research, inquiry and analytical thinking abilities.
More information:聽聽The Course outline will be made available closer to the start of term - please visit this website: www.unsw.edu.au/course-outlines
Important additional information as of 2023
UNSW Plagiarism Policy
The University requires all students to be aware of its聽.
For courses convened by the聽School of Mathematics and Statistics no assistance using generative AI software is allowed unless specifically referred to in the individual assessment tasks.
If its use is detected in the no assistance case, it will be regarded as serious academic misconduct and subject to the standard penalties, which may include 00FL, suspension and exclusion.
If you are currently enrolled in MATH5305, you can log into聽for this course.
Course overview
Topics to be covered in the course include:
- Finite differences for stationary problems in 1 dimension
- Finite differences for parabolic problems in 1 dimension聽
- Finite differences in 2 dimensions
- Finite elements in 2 dimensions