Fusion hierarchies, T-systems and Y-systems for the dilute A2(2) loop models

Abstract

The fusion hierarchy, T-system and Y-system of functional equations are the key to integrability for 2d lattice models. We derive these equations for the generic dilute A2(2) loop models. The fused transfer matrices are associated with nodes of the infinite dominant integral weight lattice of s(3). For generic values of the crossing parameter λ, the T- and Y-systems do not truncate. For the case λπ=(2p'-p)4p' rational so that x=eiλ is a root of unity, we find explicit closure relations and derive closed finite T- and Y-systems. The TBA diagrams of the Y-systems and associated Thermodynamic Bethe Ansatz (TBA) integral equations are not of simple Dynkin type. They involve p'+2 nodes if p is even and 2p'+2 nodes if p is odd and are related to the TBA diagrams of A2(1) models at roots of unity by a Z2 folding which originates from the addition of crossing symmetry. In an appropriate regime, the known central charges are c=1-6(p-p')2pp'. Prototypical examples of the A2(2) loop models, at roots of unity, include critical dense polymers DLM(1,2) with central charge c=-2, λ=3π8 and loop fugacity β=0 and critical site percolation on the triangular lattice DLM(2,3) with c=0, λ=π3 and β=1. Solving the TBA equations for the conformal data will determine whether these models lie in the same universality classes as their A1(1) counterparts. More specifically, it will confirm the extent to which bond and site percolation lie in the same universality class as logarithmic conformal field theories.