Haag duality and the distal split property for cones in the toric code

Abstract

We prove that Haag duality holds for cones in the toric code model. That is, for a cone Lambda, the algebra RLambda of observables localized in Lambda and the algebra RLambdac of observables localized in the complement Lambdac generate each other's commutant as von Neumann algebras. Moreover, we show that the distal split property holds: if Lambda1 ⊂ Lambda2 are two cones whose boundaries are well separated, there is a Type I factor N such that RLambda1 ⊂ N ⊂ RLambda2. We demonstrate this by explicitly constructing N.