Solvable lattice models labelled by Dynkin diagrams
- 21 May 1993
- journal article
- research article
- Published by IOP Publishing in Journal of Physics A: General Physics
- Vol. 26 (10) , 2301-2316
- https://doi.org/10.1088/0305-4470/26/10/005
Abstract
An equivalence between generalized restricted solid-on-solid (RSOS) models, associated with sets of graphs, and multi-colour loop models is established. As an application we consider solvable loop models and, in this way, obtain new solvable families of critical RSOS models. These families can all be classified by the Dynkin diagrams of the simply laced Lie algebras. For one of the RSOS Models, labelled by the Lie algebra pair (A(L),A(L)) and related to the C-2(1) vertex model, we give an off-critical extension, which breaks the Z2 symmetry Of the Dynkin diagrams.All Related Versions
This publication has 22 references indexed in Scilit:
- Exact multicritical behaviour of the Potts modelJournal of Physics A: General Physics, 1993
- New construction of solvable lattice models including an Ising model in a fieldPhysical Review Letters, 1992
- On the construction of integrable dilute ADE modelsPhysics Letters B, 1992
- Solvable lattice models related to the vector representation of classical simple Lie algebrasCommunications in Mathematical Physics, 1988
- A class of interaction-round-a-face models and its equivalence with an ice-type modelJournal of Statistical Physics, 1987
- QuantumR matrix for the generalized Toda systemCommunications in Mathematical Physics, 1986
- Solutions of the Yang-Baxter equationJournal of Mathematical Sciences, 1982
- The inverse scattering method approach to the quantum Shabat-Mikhailov modelCommunications in Mathematical Physics, 1981
- On a method of constructing factorized S matrices in elementary functionsTheoretical and Mathematical Physics, 1980
- Exactly Solvable Model for the Roughening Transition of a Crystal SurfacePhysical Review Letters, 1977