Applied Mathematics Projects Available 2008-9

O Chalykh	Elliptic functions and applications
O Chalykh	Algebraic curves and nonlinear integrable differential equations
SAEG Falle	Relaxation shock structures
AP Fordy	Exact solutions of nonlinear differential equations
AP Fordy	Exactly solvable potentials in Quantum Mechanics
AP Fordy	Completely integrable Hamiltonian systems
O Harlen	Slender body theory
O Harlen	Stretching filaments of polymeric fluids
O Harlen	Acoustic scattering
R Hollerbach	Instabilities of Couette flows
CA Jones	Tidal theory
CA Jones	Models of giant planets
MA Kelmanson	Integral equations
E Kersalé	Numerical Analysis of Spectral Methods
E Kersalé	Dynamics of Accretion Discs
SS Komissarov	1D computer code for gas dynamics
D Lesnic	Inverse problems in diffusion
G Lythe	Noisy dynamics and stochastic differential equations
AV Mikhailov	Approximate symmetries and almost integrable equations
C Molina-Paris	How does our body defend itself against viral infections? Modelling T-cell activation
DJ Read	Branched Polymers in all shapes and sizes
DJ Read	Self-avoiding random walks on a lattice
AM Rucklidge	Synchronization of nonlinear oscillators
AM Rucklidge	Speciation as a symmetry-breaking bifurcation
Rob Sturman	The Birkhoff Ergodic Theorem
Rob Sturman	Mixing by Chaotic Advection
Rob Sturman	The Mathematics of Musical Tuning
SM Tobias	Stably Stratified Fluid Dynamics
SM Tobias	The Sun's magnetic field

Page created by allan@maths.leeds.ac.uk
Last updated 14th May, 2008