Integrable Lattice Realizations of Conformal Twisted Boundary Conditions

Abstract

We construct integrable realizations of conformal twisted boundary conditions for sl(2) unitary minimal models on a torus. These conformal field theories are realized as the continuum scaling limit of critical A-D-E lattice models with positive spectral parameter. The integrable seam boundary conditions are labelled by (r,s,ζ) in (Ag-2,Ag-1,) where is the group of automorphisms of G and g is the Coxeter number of G. Taking symmetries into account, these are identified with conformal twisted boundary conditions of Petkova and Zuber labelled by (a,b,γ) in (Ag-2xG, Ag-2xG,Z2) and associated with nodes of the minimal analog of the Ocneanu quantum graph. Our results are illustrated using the Ising (A2,A3) and 3-state Potts (A4,D4) models.

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