This thesis investigates the mathematical and physical foundations of topological defects. We first introduce the mathematical background, which consists of the theory of Lie groups and their...Show moreThis thesis investigates the mathematical and physical foundations of topological defects. We first introduce the mathematical background, which consists of the theory of Lie groups and their corresponding Lie algebras, and fibre bundles, principal bundles and connections on principal bundles. We also give an introduction to classical field theory, and present the Lagrangian formalism for fields and Yang-Mills theory. We cover spontaneous symmetry breaking, and we explain how this can lead to topological defects using the Kibble mechanism. Finally, we classify topological defects using homotopy groups, for which we develop the underlying framework.Show less
The construction of the supersymmetric non-linear sigma model is presented. This model is then applied to the symmetry group SU(2N). The thesis considers the gauging of different subgroups of SU(2N...Show moreThe construction of the supersymmetric non-linear sigma model is presented. This model is then applied to the symmetry group SU(2N). The thesis considers the gauging of different subgroups of SU(2N), whereupon the particle spectrum of the theory is determined. The thesis concludes with an outline on how to proceed.Show less
