Minimally extended current algebras of toroidal conformal field theories
Minimally extended current algebras of toroidal conformal field theories
It is well-known that families of two-dimensional toroidal conformal field theories possess a dense subset of rational toroidal conformal field theories, which makes such families an interesting testing ground about rationality of conformal field theories in families in general. Rational toroidal conformal field theories possess an extended chiral and anti-chiral algebra known as W-algebras. Their partition functions decompose into a finite sum of products of holomorphic and anti-holomorphic characters of these W-algebras. Instead of considering these characters, we decompose the partition functions into products of characters of minimal extensions of Û (1) current algebras, which already appear for rational conformal field theories with target space S1. We present an explicit construction that determines such decompositions. While these decompositions are not unique, they are universal in the sense that any rational toroidal conformal field theory with a target space torus of arbitrary dimension admits such decompositions. We illustrate these decompositions with a few representative examples of rational toroidal conformal field theories with two- and three-dimensional target space tori.
Jockers, Hans
dfc07c0d-f7b2-4744-862a-ab24847d1831
Sarve, Maik
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Zadeh, Ida G.
f1a525ce-9b07-456b-a4f3-435434f833ae
22 July 2024
Jockers, Hans
dfc07c0d-f7b2-4744-862a-ab24847d1831
Sarve, Maik
10dbd403-c504-435c-be51-cc737e836214
Zadeh, Ida G.
f1a525ce-9b07-456b-a4f3-435434f833ae
Jockers, Hans, Sarve, Maik and Zadeh, Ida G.
(2024)
Minimally extended current algebras of toroidal conformal field theories.
Journal of High Energy Physics, 2024, [187].
(doi:10.1007/JHEP07(2024)187).
Abstract
It is well-known that families of two-dimensional toroidal conformal field theories possess a dense subset of rational toroidal conformal field theories, which makes such families an interesting testing ground about rationality of conformal field theories in families in general. Rational toroidal conformal field theories possess an extended chiral and anti-chiral algebra known as W-algebras. Their partition functions decompose into a finite sum of products of holomorphic and anti-holomorphic characters of these W-algebras. Instead of considering these characters, we decompose the partition functions into products of characters of minimal extensions of Û (1) current algebras, which already appear for rational conformal field theories with target space S1. We present an explicit construction that determines such decompositions. While these decompositions are not unique, they are universal in the sense that any rational toroidal conformal field theory with a target space torus of arbitrary dimension admits such decompositions. We illustrate these decompositions with a few representative examples of rational toroidal conformal field theories with two- and three-dimensional target space tori.
Text
JHEP07(2024)187 (1)
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Accepted/In Press date: 2 July 2024
Published date: 22 July 2024
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Local EPrints ID: 502976
URI: http://eprints.soton.ac.uk/id/eprint/502976
ISSN: 1126-6708
PURE UUID: b3d4892f-b807-41af-a91e-85e4de169ac2
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Date deposited: 15 Jul 2025 16:51
Last modified: 22 Aug 2025 02:43
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Author:
Hans Jockers
Author:
Maik Sarve
Author:
Ida G. Zadeh
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