Add to ORKGA new class of $A^{(1)}_n$ integrable lattice models is presented. These are interaction-round-a-face models based on fundamental nimrep graphs associated with the $A^{(1)}_n$ conjugate modular invariants, there being a model for each value of the rank and level. The Boltzmann weights are parameterized by elliptic theta functions and satisfy the Yang-Baxter equation for any fixed value of the elliptic nome q. At q=0, the models provide representations of the Hecke algebra and are expected to lead in the continuum limit to coset conformal field theories with torus partition functions described by the $A^{(1)}_n$ conjugate modular invariants
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
We report progress in constructing Boltzmann weights for integrable three-dimensional lattice spin m...
International audienceWe explain how to obtain new classical integrable field theories by assembling...
Integrable boundary conditions are studied for critical ADE and general graph-based lattice models o...
Integrable boundary conditions are studied for critical A{D{E and general graph-based lattice models...
Functional equations, in the form of fusion hierarchies, are studied for the transfer matrices of th...
The study of the integrability properties of the N=2 Landau- Ginzburg models leads naturally to a gr...
ABSTRACT. This paper gives a general construction of an integrable lattice model (and a solution of ...
Recently, there has been observed an interesting correspondence between supersymmetric quiver gauge ...
In this work we study the solutions of the Yang-Baxter equation associated to nineteen vertex models...
We study integrable realizations of conformal twisted boundary conditions for s(2) unitary minimal m...
The dimer model on a strip is considered as a Yang-Baxter integrable six vertex model at the free-fe...
We use boundary weights and re°ection equations to obtain families of commuting double-row transfer ...
LaTeX2e with epic macro, 21 pages; references added/corrected; the algebraic Bethe Ansatz solution f...
We report progress in constructing Boltzmann weights for integrable 3-dimensional lattice spin model...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
We report progress in constructing Boltzmann weights for integrable three-dimensional lattice spin m...
International audienceWe explain how to obtain new classical integrable field theories by assembling...
Integrable boundary conditions are studied for critical ADE and general graph-based lattice models o...
Integrable boundary conditions are studied for critical A{D{E and general graph-based lattice models...
Functional equations, in the form of fusion hierarchies, are studied for the transfer matrices of th...
The study of the integrability properties of the N=2 Landau- Ginzburg models leads naturally to a gr...
ABSTRACT. This paper gives a general construction of an integrable lattice model (and a solution of ...
Recently, there has been observed an interesting correspondence between supersymmetric quiver gauge ...
In this work we study the solutions of the Yang-Baxter equation associated to nineteen vertex models...
We study integrable realizations of conformal twisted boundary conditions for s(2) unitary minimal m...
The dimer model on a strip is considered as a Yang-Baxter integrable six vertex model at the free-fe...
We use boundary weights and re°ection equations to obtain families of commuting double-row transfer ...
LaTeX2e with epic macro, 21 pages; references added/corrected; the algebraic Bethe Ansatz solution f...
We report progress in constructing Boltzmann weights for integrable 3-dimensional lattice spin model...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
We report progress in constructing Boltzmann weights for integrable three-dimensional lattice spin m...
International audienceWe explain how to obtain new classical integrable field theories by assembling...