SO(d,1)-invariant Yang-Baxter operators and the dS/CFT correspondence

Abstract

We propose a model for the dS/CFT correspondence. The model is constructed in terms of a "Yang-Baxter operator" R for unitary representations of the deSitter group SO(d,1). This R-operator is shown to satisfy the Yang-Baxter equation, unitarity, as well as certain analyticity relations, including in particular a crossing symmetry. With the aid of this operator we construct: a) A chiral (light-ray) conformal quantum field theory whose internal degrees of freedom transform under the given unitary representation of SO(d,1). By analogy with the O(N) non-linear sigma model, this chiral CFT can be viewed as propagating in a deSitter spacetime. b) A (non-unitary) Euclidean conformal quantum field theory on Rd-1, where SO(d,1) now acts by conformal transformations in (Euclidean) spacetime. These two theories can be viewed as dual to each other if we interpret Rd-1 as conformal infinity of deSitter spacetime. Our constructions use semi-local generator fields defined in terms of R and abstract methods from operator algebras.