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|
Adviser's Name |
Specialist Area |
|---|---|
| J Bennett | Harmonic analysis |
| N P Byott | Algebraic number theory |
| J A Carrillo | Nonlinear PDEs, numerical analysis of PDEs, and calculus of variations |
| J Chuang | Representation theory |
| A Corti | Algebraic geometry |
| A Craw | Algebraic geometry and representation theory |
| E C M Crooks | Nonlinear analysis and PDEs |
| M D P Daws | Banach and operator spaces and abstract harmonic analysis |
| F Diamond | Automorphic forms and Galois representations |
| K Dykema | Operator algebras and free probability theory |
| M Haskins | Geometric analysis and differential geometry |
| A Hinkkanen | Complex analysis and potential theory |
| J R Hunton | Algebraic topology and K-theory |
| T Hytönen | Harmonic analysis and operator theory |
| G Infante | Ordinary differential equations |
| O M Jenkinson | Dynamical systems and ergodic theory |
| P Jørgensen | Noncommutative algebra and homological algebra |
| M Kim | Algebraic number theory and arithmetic geometry |
| I J Leary | Discrete groups and topology |
| P A Linnell | Discrete groups and cohomology |
| D D Long | Low-dimensional topology, geometry and discrete groups |
| N J MacKay | Mathematical physics, quantum groups |
| D Maclagan | Algebraic geometry and commutative algebra |
| J E McCarthy | Operator theory and complex analysis |
| K McGerty | Algebra and representation theory |
| A Némethi | Singularity theory |
| G A Niblo | Geometric group theory and non-commutative geometry |
| N Nikolov | Finite group theory |
| T C O'Neil | Real analysis and geometric measure theory |
| A Pillay | Logic, and connections to algebra and geometry |
| T Sanders | Analytic number theory |
| D Segal | Group theory |
| A V Sobolev | Linear PDEs and spectral theory |
| A Swann | Differential geometry |
| J M Talbot | Graph theory and combinatorics |
| S L Velani | Analytic and metric number theory |
| J Warren | Probability and stochastic analysis |
| C Wendl | Symplectic and contact topology |
| B Zegarlinski | Infinite-dimensional analysis, coercive inequalities and Markov semigroups |
| B Zilber | Logic and applications in number theory and geometry |
Submitted by Ola Tornkvist on
