Memorial University of Newfoundland

The moduli space M_C of Higgs bundles over a complex curve X admits a hyperkaehler metric: a Riemannian metric which is Kaehler with respect to three different complex structures I, J, K, satisfying the quaternionic relations. If X admits an anti-holomorphic involution, then there is an induced involution on M_C which is anti-holomorphic with respect to I and J, and holomorphic with respect to K. The fixed point set of this involution, M_R, is therefore a real
Lagrangian submanifold with respect to I and J, and complex symplectic with respect to K, making it a so called AAB-brane. In this talk, I will explain how to compute the mod 2 Betti numbers of M_R using Morse theory. A key role in this calculation is played by the Abel-Jacobi map from symmetric products of X to the Jacobian of X.

Numerical simulation tools for fluid and solid mechanics are often based on the discretisation of coupled systems of partial differential equations, which can easily be identified in terms of physical
conservation laws.  In contrast, much physical insight is often gained from the equivalent formulation of the relevant energy or free-energy functional, possibly subject to constraints.  Motivated by the
nonlinear static and dynamic behaviour of nematic liquid crystals and of magnetosensitive elastomers, we propose a finite-element framework for minimising these free-energy functionals, using Lagrange multipliers to enforce additional constraints.  This talk will highlight challenges, limitations, and successes, both in the formulation of these models and their use in numerical simulation.
This is joint work with PhD students Thomas Benson, David Emerson, and Dong Han, and with James Adler, Timothy Atherton, and Luis Dorfmann.