On the Quantum Symmetry of the Chiral Ising Model

Abstract

We introduce the notion of rational Hopf algebras that we think are able to describe the superselection symmetries of two dimensional rational quantum field theories. As an example we show that a six dimensional rational Hopf algebra H can reproduce the fusion rules, the conformal weights, the quantum dimensions and the representation of the modular group of the chiral Ising model. H plays the role of the global symmetry algebra of the chiral Ising model in the following sense: 1) a simple field algebra and a representation π on π of it is given, which contains the c=1/2 unitary representations of the Virasoro algebra as subrepresentations; 2) the embedding U H is such that the observable algebra π()- is the invariant subalgebra of with respect to the left adjoint action of H and U(H) is the commutant of π(); 3) there exist H-covariant primary fields in , which obey generalized Cuntz algebra properties and intertwine between the inequivalent sectors of the observables.

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