Non-commutative AdS2/CFT1 duality: the case of massless scalar fields

Abstract

We show how to construct correlators for the CFT1 which is dual to non-commutative AdS2 (ncAdS2). We do it explicitly for the example of the massless scalar field on Euclidean ncAdS2. ncAdS2 is the quantization of AdS2 that preserves all the isometries. It is described in terms of the unitary irreducible representations, more specifically discrete series representations, of so(2,1). We write down symmetric differential representations for the discrete series, and then map them to functions on the Moyal-Weyl plane. The Moyal-Weyl plane has a large distance limit which can be identified with the boundary of ncAdS2. Killing vectors can be constructed on ncAdS2 which reduce to the AdS2 Killing vectors near the boundary. We therefore conclude that ncAdS2 is asymptotically AdS2, and so the AdS/CFT correspondence should apply. For the example of the massless scalar field on Euclidean ncAdS2, the on-shell action, and resulting two-point function for the boundary theory, are computed to leading order in the noncommutativity parameter. The results agree with those of the commutative scalar field theory, up to a field redefinition.