A new equivalence between fused RSOS and loop models

Abstract

We consider the topological theories of cond-mat/0404617 and cond-mat/0610583 and study ground state amplitudes of string net configurations which consist of large chunks G of (trivalent) regular lattice. We evaluate these amplitudes in two different ways: first we use the Turaev-Viro prescription to write the amplitude as a sum over labelings of the faces of G, and second we use the local rules that constrain the amplitude (the F-matrix) to resolve subgraphs in creative ways. In the case of the Doubled Fibonacci theory this second way allows us to produce loop models. In particular, we show that the hard hexagon model is equivalent to an anisotropic loop model. Many other interesting equivalences can presumably be obtained.

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