Self-dual vortices in a Maxwell-Chern-Simons model with non-minimal   coupling

H.R. Christiansen; M.S. Cunha; J.A. Helayel-Neto; L.R.U. Manssur,; A.L.M.A. Nogueira

arXiv:hep-th/9805128·hep-th·October 31, 2009

Self-dual vortices in a Maxwell-Chern-Simons model with non-minimal coupling

H.R. Christiansen, M.S. Cunha, J.A. Helayel-Neto, L.R.U. Manssur,, A.L.M.A. Nogueira

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TL;DR

This paper discovers self-dual vortex solutions in a Maxwell-Chern-Simons model with anomalous magnetic moment, deriving Bogomol'nyi equations and a Higgs potential that support both topological and non-topological phases.

Contribution

It introduces a supersymmetric extension to derive Bogomol'nyi equations and a suitable Higgs potential for the model.

Findings

01

Self-dual vortex solutions identified.

02

Bogomol'nyi equations derived from supersymmetry.

03

Higgs potential supports multiple phases.

Abstract

We find self-dual vortex solutions in a Maxwell-Chern-Simons model with anomalous magnetic moment. From a recently developed N=2-supersymmetric extension, we obtain the proper Bogomol'nyi equations together with a Higgs potential allowing both topological and non-topological phases in the theory.

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