Chern-Simons Gauge Theory on Orbifolds: Open Strings from Three Dimensions

TL;DR

This paper explores the relationship between Chern-Simons gauge theory on three-dimensional orbifolds and two-dimensional conformal field theories, revealing connections to open string spectra and worldsheet orbifold models.

Contribution

It establishes a novel correspondence between Chern-Simons theory on orbifolds and unoriented open and closed string models, including a new interpretation of the orbifold group as part of the gauge group.

Findings

Correlation functions reduce to sums over simpler theories.

Open string spectra are identified via Wilson lines.

Examples demonstrate the natural inclusion of orbifold groups in gauge theories.

Abstract

Chern-Simons gauge theory is formulated on three dimensional $Z_2$ orbifolds. The locus of singular points on a given orbifold is equivalent to a link of Wilson lines. This allows one to reduce any correlation function on orbifolds to a sum of more complicated correlation functions in the simpler theory on manifolds. Chern-Simons theory on manifolds is known to be related to 2D CFT on closed string surfaces; here I show that the theory on orbifolds is related to 2D CFT of unoriented closed and open string models, i.e. to worldsheet orbifold models. In particular, the boundary components of the worldsheet correspond to the components of the singular locus in the 3D orbifold. This correspondence leads to a simple identification of the open string spectra, including their Chan-Paton degeneration, in terms of fusing Wilson lines in the corresponding Chern-Simons theory. The correspondence is studied in detail, and some exactly solvable examples are presented. Some of these examples indicate that it is natural to think of the orbifold group $Z_2$ as a part of the gauge group of the Chern-Simons theory, thus generalizing the standard definition of gauge theories.