Covering space maps for n-point functions with three long twists
Covering space maps for n-point functions with three long twists
We consider correlation functions in symmetric product orbifold CFTs on the sphere, focusing on the case where all operators are single-cycle twists, and the covering surface is also a sphere. We directly construct the general class of covering space maps where there are three twists of arbitrary lengths, along with any number of twist-2 insertions. These are written as a ratio of sums of Jacobi polynomials with ∆N + 1 coefficients b
N, which parametrize the ∆N cross ratios. These coefficients have a scaling symmetry b
N → λb
N, making them naturally valued in CP∆N. We explore limits where various ramified points on the cover approach each other, which are understood as crossing channel specific OPE limits, and find that these limits are defined by algebraic varieties of CP∆N. We compute the expressions needed to calculate the group element representative correlation functions for bare twists. Specializing to the cases ∆N = 1, 2, we find closed form for these expressions which define four- and five-point functions of bare twists.
AdS-CFT Correspondence, Conformal Field Models in String Theory, Field Theories in Lower Dimensions
Burrington, Benjamin A.
29627b03-3742-4727-84aa-5501133ab0be
Zadeh, Ida G.
f1a525ce-9b07-456b-a4f3-435434f833ae
24 November 2025
Burrington, Benjamin A.
29627b03-3742-4727-84aa-5501133ab0be
Zadeh, Ida G.
f1a525ce-9b07-456b-a4f3-435434f833ae
Burrington, Benjamin A. and Zadeh, Ida G.
(2025)
Covering space maps for n-point functions with three long twists.
Journal of High Energy Physics, 2025 (11), [147].
(doi:10.1007/JHEP11(2025)147).
Abstract
We consider correlation functions in symmetric product orbifold CFTs on the sphere, focusing on the case where all operators are single-cycle twists, and the covering surface is also a sphere. We directly construct the general class of covering space maps where there are three twists of arbitrary lengths, along with any number of twist-2 insertions. These are written as a ratio of sums of Jacobi polynomials with ∆N + 1 coefficients b
N, which parametrize the ∆N cross ratios. These coefficients have a scaling symmetry b
N → λb
N, making them naturally valued in CP∆N. We explore limits where various ramified points on the cover approach each other, which are understood as crossing channel specific OPE limits, and find that these limits are defined by algebraic varieties of CP∆N. We compute the expressions needed to calculate the group element representative correlation functions for bare twists. Specializing to the cases ∆N = 1, 2, we find closed form for these expressions which define four- and five-point functions of bare twists.
Text
JHEP11(2025)147
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Accepted/In Press date: 19 October 2025
Published date: 24 November 2025
Keywords:
AdS-CFT Correspondence, Conformal Field Models in String Theory, Field Theories in Lower Dimensions
Identifiers
Local EPrints ID: 508997
URI: http://eprints.soton.ac.uk/id/eprint/508997
ISSN: 1126-6708
PURE UUID: f1954faf-086a-4cf0-bc58-d3c1534a3ca6
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Date deposited: 09 Feb 2026 17:59
Last modified: 10 Feb 2026 03:23
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Author:
Benjamin A. Burrington
Author:
Ida G. Zadeh
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