Metadata
Title
Equivalence of the Self--Dual Model and Maxwell--Chern--Simons Theory on Arbitrary Manifolds
Category
general
UUID
af23a8694c384c4b887bcb5e34f86ea9
Source URL
https://www.maths.tcd.ie/report_series/abstracts/tcdm9914.html
Parent URL
https://www.maths.tcd.ie/research/papers/
Crawl Time
2026-03-23T14:24:47+00:00
Rendered Raw Markdown

Equivalence of the Self--Dual Model and Maxwell--Chern--Simons Theory on

Arbitrary Manifolds

Source: https://www.maths.tcd.ie/report_series/abstracts/tcdm9914.html Parent: https://www.maths.tcd.ie/research/papers/

Equivalence of the Self--Dual Model and Maxwell--Chern--Simons Theory on Arbitrary Manifolds

Using a group-invariant version of the Faddeev--Popov method we explicitly obtain the partition functions of the Self--Dual Model and Maxwell--Chern--Simons theory. We show that their ratio coincides with the partition function of abelian Chern--Simons theory to within a phase factor depending on the geometrical properties of the manifold.