Abstract
The scattering of vortices at a critical value of the coupling constant in the Lagrangian can be approximated by a geodesic motion in the moduli space of classical static configurations of vortices. In this paper we give a scheme for generalising this idea to couplings that are near to the critical value. By perturbing a critically coupled field, we show that scattering of vortices at near-critical coupling can be approximated by motion in the original moduli space with a perturbed metric, and a potential. We apply this method to the scattering of two vertices, and compare our results to recent numerical simulations, and find good agreement where the scattering is not highly sensitive to radiation into other field modes. We also investigate the possibility of bound stable orbits of two vertices in the quantum field theory.
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