Analysis of Stationary and Transient Partial Differential Equations of Continuum Mechanics and Mathematical Physics
Applications are invited for our EPSRC funded Doctoral Training Partnership (DTP) PhD studentship for the project “Analysis of Stationary and Transient Partial Differential Equations of Continuum Mechanics and Mathematical Physics” starting 1 April 2022. Successful applicants will receive an annual stipend (bursary) of £17,609, including inner London weighting, plus payment of their full-time tuition fees for a period of 36-months (3 years).
Applicants must be classified as home (UK) tuition fee paying student to be eligible for this studentship.
This research project is focused on mathematical analysis of linear and nonlinear elliptic and parabolic Partial Differential Equations (PDEs) with constant and variable coefficients. The considered PDEs arise naturally in engineering and physics as mathematical models of stationary and transient processes in inhomogeneous media, e.g. heat transfer in inhomogeneous materials with thermo-conductivity coefficients depending on the point temperature and coordinate, materials with damage-induced inhomogeneity, elasto-plastic materials, potential and viscous compressible flows, fluid flows through porous media, electromagnetics and other areas of mathematical physics. Analysis is supposed to be done in appropriate Sobolev-type function spaces by implementing variational techniques, operator calculus, semi-group theory and other methods of functional analysis.
Please contact Professor Sergey Mikhailov at email@example.com for information about the project.
Skills and Experience
Applicants will be required to demonstrate their knowledge and expertise in real analysis, partial differential equations and functional analysis as well as their ability to apply the knowledge to the given project. You should be highly motivated, able to work independently as well as in a team and have appropriate communication skills.
Academic Entry Criteria
You will have or be expected to receive a 1st class or 2:1 honours degree in Mathematics or a similar discipline. A postgraduate masters degree is not required but may be an advantage.
How to apply
Please submit the documents below as a single PDF file by email to firstname.lastname@example.org by 14:00 on Monday 28 February 2022.
- Your up-to-date CV;
- Your personal statement (300 to 500 words) summarising your background, skills and experience. Please state the name of the project supervisor at the top of your personal statement;
- Your Undergraduate/Postgraduate Masters degree certificate(s) and transcript(s);
- Your English Language qualification of IELTS 6.5 (minimum 6.0 in all sections) or equivalent, if appropriate;
- Contact details for TWO referees, one of whom may be a member of Brunel University academic staff.
Interviews will take place in early/mid-March 2022.