Integrable Boundaries, Conformal Boundary Conditions and A-D-E Fusion Rules

Abstract

The sl(2) minimal theories are labelled by a Lie algebra pair (A,G) where G is of A-D-E type. For these theories on a cylinder we conjecture a complete set of conformal boundary conditions labelled by the nodes of the tensor product graph A G. The cylinder partition functions are given by fusion rules arising from the graph fusion algebra of A G. We further conjecture that, for each conformal boundary condition, an integrable boundary condition exists as a solution of the boundary Yang-Baxter equation for the associated lattice model. The theory is illustrated using the (A4,D4) or 3-state Potts model.

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