CSBIon -- a charged soliton of the 3-dimensional CS + BI Abelian gauge theory

TL;DR

This paper constructs a finite-energy charged soliton in a 3D Abelian gauge theory with Chern-Simons and Born-Infeld terms, offering a new model for charged particles without sources.

Contribution

It introduces the CSBIon, a novel finite-energy soliton solution in 3D Abelian gauge theory with Chern-Simons and Born-Infeld modifications, extending previous models.

Findings

Finite energy, source-free charged soliton solution found.

Solution carries charge N and has radius independent of N.

Potential applications in holography and condensed matter systems.

Abstract

In this paper, we construct a charged soliton with a finite energy and no delta function source in a pure Abelian gauge theory. Specifically, we first consider the 3-dimensional Abelian gauge theory, with a Maxwell term and a l evel $N$ CS term. We find a static solution that carries charge $N$, angular momentum $\frac{N}{2}$ and whose radius is $N$ independent. However, this solution has a divergent energy. In analogy to the replacement of the 4 dimensional Maxwell action with the BI action, which renders the classical energy of a point charge finite, for the 3 dimensional theory which includes a CS term such a replacement leads to a finite energy for the solution of above. We refer to this soliton as a CSBIon solution, representing a finite energy version of the fundamental (sourced) charged electron of Maxwell theory in 4 dimensions. In 3 dimensions the BI+CS action has a static charged solution with finite energy and no source, hence a soliton solution. The CSBIon, similar to its Maxwellian predecessor, has a charge $N$, angular momentum proportional to $N$ and an $N$-independent radius. We also present other nonlinear modifications of Maxwell theory that admit similar solitons. The CSBIon may be relevant in various holographic scenarios. In particular, it may describe a D6-brane wrapping an $S^4$ in a compactified D4-brane background. We believe that the CSBIon may play a role in condensed matter systems in 2+1 dimensions like graphene sheets.