Abstract :
Ideas from conformal field theory are applied to symplectic four-manifolds through the use of
modular functors to ‘linearise’ Lefschetz fibrations. In Chern–Simons theory, this leads to the
study of parabolic vector bundles of conformal blocks. Motivated by the Hard Lefschetz theorem,
the author shows that the bundles of SU(2) conformal blocks associated to K¨ahler surfaces are
Brill–Noether special, although the associated flat connexions may be irreducible if the surface is
simply connected and not spin.
