11 research outputs found
Integrability, spin-chains and the AdS3/CFT2 correspondence
Building on arXiv:0912.1723, in this paper we investigate the AdS3/CFT2
correspondence using integrability techniques. We present an all-loop Bethe
Ansatz (BA) for strings on AdS_3 x S^3 x S^3 x S^1, with symmetry
D(2,1;alpha)^2, valid for all values of alpha. This construction relies on a
novel, alpha-dependent generalisation of the Zhukovsky map. We investigate the
weakly-coupled limit of this BA and of the all-loop BA for strings on AdS_3 x
S^3 x T^4. We construct integrable short-range spin-chains and Hamiltonians
that correspond to these weakly-coupled BAs. The spin-chains are alternating
and homogenous, respectively. The alternating spin-chain can be regarded as
giving some of the first hints about the unknown CFT2 dual to string theory on
AdS_3 x S^3 x S^3 x S^1. We show that, in the alpha to 1 limit, the integrable
structure of the D(2,1;alpha) model is non-singular and keeps track of not just
massive but also massless modes. This provides a way of incorporating massless
modes into the integrability machinery of the AdS3/CFT2 correspondence.Comment: LaTeX, 38 pages. v2: Corrected misprints in section 6.