Brunel University London

Course Introduction

The programme includes taught elements over all years which cover generic skills (professional skills, career planning), research methods, and discipline'specific modules; the main research areas are: applied mathematics; mathematical physics; computational optimisation and modelling; operational research; numerical analysis and computation.

Course Modules

Research areas: numerical solution of ordinary differential equations; numerical solution of partial differential equations; dynamical systems; non'linear algebraic systems and optimisation; integral equations; finite'element analysis; advanced mathematical modelling; financial optimisation in practice; mathematical programming and optimisation.

Course Additional Entry

An upper 2nd Class degree or a Master's degree of a UK university (or recognised equivalent UK or overseas qualification) in a relevant subject; other qualifications considered on an individual basis.

Duration & Attendance Qualification Tuition fees
4 years
Full Time
PhD with Integrated Study