A Gluing Problem for a Gauged Hyperbolic PDE
Abstract
In this project, we study the hyperbolic Abelian Higgs model in dimension at the critical coupling. The stationary solutions to the two-dimensional version of this equation have been found by Jaffe and Taubes, the so called -vortex configurations. One can consider the space of all -vortex configurations as a smooth Riemannian manifold. Stuart has proved that near the critical coupling regime, the dynamic in dimension can be approximated by a finite dimensional Hamiltonian system on the moduli space , for suitable initial data. In this thesis, we study how to glue the -vortex configurations to construct dynamical solutions in dimension . Namely, we prove that if is a wave map, then for small enough, there exists a solution of the Abelian Higgs model in dimension on for some which is close to in terms of , where denotes the variables of the corresponding -vortex configuration. Furthermore, the other gauge field variables are small in terms of . This dissertation has been supervised by Prof. Robert Jerrard.
Keywords
Cite
@article{arxiv.2405.16092,
title = {A Gluing Problem for a Gauged Hyperbolic PDE},
author = {Amirmasoud Geevechi},
journal= {arXiv preprint arXiv:2405.16092},
year = {2024}
}