? Credit Points : 20  ? SCQF Level : 10  ? Acronym : MAT-3-CVD

Core course for Honours Degrees involving Mathematics and/or Statistics; also available for Ordinary Degree students.

Syllabus summary: Power series and differential equations, systems of ODEs, separation of variables, orthogonal expansions and applications, analytic functions, contour integrals, Laurent series and residues and Fourier transform.

? Pre-requisites : MAT-2-FoC, MAT-2-SVC, MAT-2-LiA, MAT-2-MAM

? Prohibited combinations : MAT-3-CoV, similar courses from Mathematics 3 (Hons) prior to 2004-05; PHY-3-PhMath

? This course has variants for part year visiting students, as follows

• Differential Equations (VS1) (Semester 1 (Blocks 1-2))

Home subject area

Specialist Mathematics & Statistics (Honours), (School of Mathematics, Schedule P)

? Normal year taken : 3rd year

? Delivery Period : Full Year (Blocks 1-4)

? Contact Teaching Time : 3 hour(s) per week for 22 weeks

First Class Information

Date Start End Room Area Additional Information 07/01/2008 12:10 13:00 Lecture Theatre B, JCMB KB

All of the following classes

Type Day Start End Area Lecture Monday 12:10 13:00 KB Lecture Thursday 12:10 13:00 KB

? Additional Class Information : Supervision: one hour per week (shared with other 'core' courses), at a time to be arranged with Supervisor.

1. Solution of a linear system (in non-degenerate cases) using eigenpairs
2. Evaluation and application of matrix exponential (in non-degenerate cases)
3. Classification of planar linear systems (non-degenerate cases)
4. Determination of stability and classification of an equilibrium of a planar nonlinear system, by linearisation
5. Graphic use of integral of a conservative planar system
6. Acquaintance with Poincare-Bendixson Theorem
7. Acquaintance with basic partial differential equations and types of boundary conditions
8. Solution of first-order linear pde with constant coefficients
9. Solution of the wave equation by change of variable, leading to d'Alembert's solution
10. Acquaintance with notions of existence and uniqueness by example
11. Separation of variables for wave equation (finite string) and Laplace's equation (disc)
12. Handling Fourier series as orthogonal expansions, with an inner product and projection operator
13. Self-adjoint linear differential operators and their elementary spectral properties
14. The notion of completeness
15. Power series solution about a regular points of an analytic ordinary differential equation
16. Power series solution of Bessel's equation of order 0
17. Solutions of the wave equation for a circular drum
18. Knowledge of basic properties of analytic functions of a complex variable, including power-series expansions, Laurent expansions, and Liouville's theorem
19. The idea of conformal mapping, use of fractional linear transformations
20. Knowledge of the fundamental integral theorems of complex analysis
21. Ability to use residue calculus to perform definite integrals
22. Knowledge of some of the relations between analytic functions and PDE, e.g. relation to harmonic functions, the maximum principle
23. Familiarity with the Fourier integral as a tool for the study of ordinary and partial differential equations.

Examination only.

Exam times

Diet Diet Month Paper Code Paper Name Length 1ST May 1 - 3 hour(s)

The Course Secretary should be the first point of contact for all enquiries.

Course Secretary

Mrs Catriona Galloway
Tel : (0131 6)50 4885
Email : C.Galloway@ed.ac.uk

Course Organiser

Dr Toby Bailey
Tel : (0131 6)50 5068
Email : t.n.bailey@ed.ac.uk

Course Website : http://student.maths.ed.ac.uk

School Website : http://www.maths.ed.ac.uk/

College Website : http://www.scieng.ed.ac.uk/