We present a map between the excitation of the symmetric-product orbifold CFT of T-4, and of the worldsheet-integrability description of AdS(3) x S-3 x T-4 of Lloyd, Ohlsson Sax, Sfondrini, and Stefa & nacute;ski at k = 1. We discuss the map in the absence of RR fluxes, when the theory is free, and at small RR flux, h << 1, where the symmetric-orbifold CFT is deformed by a marginal operator from the twist-two sector. We discuss the recent results of Gaberdiel, Gopakumar, and Nairz, who computed from the perturbed symmetric-product orbifold the central extension to the symmetry algebra of the theory and its coproduct. We show that it coincides with the h << 1 expansion of the lightcone symmetry algebra known from worldsheet integrability, and that hence the S matrix found by Gaberdiel, Gopakumar, and Nairz maps to the one bootstrapped by the worldsheet integrability approach.
Comments on integrability in the symmetric orbifold
Sfondrini, Alessandro
2024
Abstract
We present a map between the excitation of the symmetric-product orbifold CFT of T-4, and of the worldsheet-integrability description of AdS(3) x S-3 x T-4 of Lloyd, Ohlsson Sax, Sfondrini, and Stefa & nacute;ski at k = 1. We discuss the map in the absence of RR fluxes, when the theory is free, and at small RR flux, h << 1, where the symmetric-orbifold CFT is deformed by a marginal operator from the twist-two sector. We discuss the recent results of Gaberdiel, Gopakumar, and Nairz, who computed from the perturbed symmetric-product orbifold the central extension to the symmetry algebra of the theory and its coproduct. We show that it coincides with the h << 1 expansion of the lightcone symmetry algebra known from worldsheet integrability, and that hence the S matrix found by Gaberdiel, Gopakumar, and Nairz maps to the one bootstrapped by the worldsheet integrability approach.
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