Yang-Mills heat flow on gauged holomorphic maps

Abstract

We study the gradient flow lines of a Yang-Mills-type functional on the space of gauged holomorphic maps H(P,X), where P is a principal bundle on a Riemann surface and X is a K\"ahler Hamiltonian G-manifold. For compact , possibly with boundary, we prove long time existence of the gradient flow. The flow lines converge to critical points of the functional. So, there is a stratification on H(P,X) that is invariant under the action of the complexified gauge group. Symplectic vortices are the zeros of the functional we study. When has boundary, similar to Donaldson's result for the Hermitian Yang-Mills equations, we show that there is only a single stratum - any element of H(P,X) can be complex gauge transformed to a symplectic vortex. This is a version of Mundet's Hitchin-Kobayashi result on a surface with boundary.