Ian T. Jardine scite author profile

In this work, we explore the twist operator OPEs of a generic bosonic symmetric product (S N ) orbifold CFT. We conjecture that at large N the OPE of bare twist operators contains only bare twists and excitations of bare twists with fractional Virasoro modes. These fractionally excited operators are the only ones that depend exclusively on the lengths of the twists and the central charge, agreeing with the general structure of correlators of bare twists found in the literature. To provide evidence for this, we study the coincidence limit of a four point function of bare twist operators to several non-leading orders. We show how the coefficients of these powers can be reproduced by considering bare twist operators excited by fractional Virasoro modes in the exchange channels.

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Operator mixing in deformed D1D5 CFT and the OPE on the cover

Burrington

Jardine

Peet

2017

J. High Energ. Phys.

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We consider the D1D5 CFT near the orbifold point and develop methods for computing the mixing of untwisted operators to first order by using the OPE on the covering surface. We argue that the OPE on the cover encodes both the structure constants for the orbifold CFT and the explicit form of the mixing operators. We show this explicitly for some example operators. We start by considering a family of operators dual to supergravity modes, and show that the OPE implies that there is no shift in the anomalous dimension to first order, as expected. We specialize to the operator dual to the dilaton, and show that the leading order singularity in the OPE reproduces the correct structure constant. Finally, we consider an unprotected operator of conformal dimension (2,2), and show that the leading order singularity and one of the subleading singularities both reproduce the correct structure constant. We check that the operator produced at subleading order using the OPE method is correct by calculating a number of three point functions using a Mathematica package we developed. Further development of this OPE technique should lead to more efficient calculations for the D1D5 CFT perturbed away from the orbifold point.

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The large N limit of OPEs in symmetric orbifold CFTs with $$ \mathcal{N} $$ = (4, 4) supersymmetry

Beer

Burrington

Jardine

et al. 2019

J. High Energ. Phys.

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We explore the OPE of certain twist operators in symmetric product (S N) orbifold CFTs, extending our previous work [1] to the case of N = (4, 4) supersymmetry. We consider a class of twist operators related to the chiral primaries by spectral flow parallel to the twist. We conjecture that at large N , the OPE of two such operators contains only fields in this class, along with excitations by fractional modes of the superconformal currents. We provide evidence for this by studying the coincidence limits of two 4-point functions to several non-trivial orders. We show how the fractional excitations of the twist operators in our restricted class fully reproduce the crossing channels appearing in the coincidence limits of the 4-point functions.

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Holographic relations for OPE blocks in excited states

Cresswell

Jardine

Peet

2019

J. High Energ. Phys.

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We study the holographic duality between boundary OPE blocks and geodesic integrated bulk fields in quotients of AdS 3 dual to excited CFT states. The quotient geometries exhibit non-minimal geodesics between pairs of spacelike separated boundary points which modify the OPE block duality. We decompose OPE blocks into quotient invariant operators and propose a duality with bulk fields integrated over individual geodesics, minimal or non-minimal. We provide evidence for this relationship by studying the monodromy of asymptotic maps that implement the quotients.

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Ian T. Jardine

Nature of theDs1(2710)andDsJ
Godfrey
¹
,
Jardine
²

2014
Phys. Rev. D
27
2
50
0
View full text Add to dashboard Cite

The OPE of bare twist operators in bosonic SN orbifold CFTs at large N

Operator mixing in deformed D1D5 CFT and the OPE on the cover

The large N limit of OPEs in symmetric orbifold CFTs with $$ \mathcal{N} $$ = (4, 4) supersymmetry

Holographic relations for OPE blocks in excited states

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About

Ian T. Jardine

Nature of theDs1*(2710)andDsJ*Godfrey1, Jardine2 2014Phys. Rev. D272500View full textAdd to dashboardCite

The OPE of bare twist operators in bosonic SN orbifold CFTs at large N

Operator mixing in deformed D1D5 CFT and the OPE on the cover

The large N limit of OPEs in symmetric orbifold CFTs with $$ \mathcal{N} $$ = (4, 4) supersymmetry

Holographic relations for OPE blocks in excited states

Contact Info

Product

Resources

About

Nature of theDs1(2710)andDsJ
Godfrey
¹
,
Jardine
²

2014
Phys. Rev. D
27
2
50
0
View full text Add to dashboard Cite