Vortices on Hyperbolic Surfaces
Abstract
It is shown that abelian Higgs vortices on a hyperbolic surface can be constructed geometrically from holomorphic maps , where is also a hyperbolic surface. The fields depend on and on the metrics of and . The vortex centres are the ramification points, where the derivative of vanishes. The magnitude of the Higgs field measures the extent to which is locally an isometry. Witten's construction of vortices on the hyperbolic plane is rederived, and new examples of vortices on compact surfaces and on hyperbolic surfaces of revolution are obtained. The interpretation of these solutions as SO(3)-invariant, self-dual SU(2) Yang--Mills fields on is also given.
Keywords
Cite
@article{arxiv.0912.2058,
title = {Vortices on Hyperbolic Surfaces},
author = {Nicholas S. Manton and Norman A. Rink},
journal= {arXiv preprint arXiv:0912.2058},
year = {2011}
}
Comments
Revised version: new section on four-dimensional interpretation of hyperbolic vortices added.