
Academic Year:  2017/8 
Owning Department/School:  Department of Mathematical Sciences 
Credits:  6 [equivalent to 12 CATS credits] 
Notional Study Hours:  120 
Level:  Masters UG & PG (FHEQ level 7) 
Period: 

Assessment Summary:  CW 20%, EX 80% 
Assessment Detail: 

Supplementary Assessment: 

Requisites: 
Before taking this module you must take MA20216 AND take MA20218 AND take MA20219 AND take MA20223
In taking this module you cannot take MA30044 . This unit may only be taken by students on Mathematics and Physics programmes. 
Description:  Aims & Learning Objectives: Aims: To furnish the student with a range of analytic techniques for the solution of ODEs and PDEs with applications to advanced physical problems. Objectives: Students should be able to obtain the solution of certain ODEs and PDEs, and in cases interpret these in physical terms. They should also be aware of certain analytic properties associated with the solution e.g. uniqueness. Content: SturmLiouville theory: Reality of eigenvalues. Orthogonality of eigenfunctions. Expansion in eigenfunctions. Approximation in mean square. Statement of completeness. Fourier Transform: As a limit of Fourier series. Properties and applications to solution of differential equations. Frequency response of linear systems. Characteristic functions. Linear and quasilinear secondorder PDEs in two independent variables: CauchyKovalevskaya theorem (without proof). Characteristic data. Lack of continuous dependence on initial data for Caucy problem. Classification as elliptic, parabolic, and hyperbolic. Different standard forms. Constant and nonconstant coefficients. Onedimensional wave equation: d'Alembert's solution. Uniqueness theorem for corresponding Cauchy problem (with data on a spacelike curve). Applications to physical problems. Translate advanced physical problems into mathematical form; obtain and interpret mathematical solutions. 
Programme availability: 
MA40044 is Compulsory on the following programmes:Department of Physics
MA40044 is Optional on the following programmes:Department of Mathematical Sciences

Notes:
