We consider a discrete classical integrable model on a three-dimensional cubic lattice. The solutions of this model can be used to parameterize the Boltzmann weights of various three-dimensional spin models. We find the general solution of this model constructed in terms of the theta functions defined on an arbitrary compact algebraic curve. Imposing periodic boundary conditions fixes the algebraic curve. We show that the curve then coincides with the spectral curve of the auxiliary linear problem. For a rational curve, we construct the soliton solution of the model
Spectra and eigenfunctions of discrete hamiltonians are computed using algebraic, analytic and numer...
We investigate some classical evolution model in the discrete 2+1 space-time. A map, giving an one-s...
Abstract It is argued that the supersymmetric index of a certain system of branes in M-theory is equ...
We report progress in constructing Boltzmann weights for integrable 3-dimensional lattice spin model...
We report progress in constructing Boltzmann weights for integrable three-dimensional lattice spin m...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
It has recently been established that imposing the condition of discrete holomorphicity on a lattice...
In this paper we construct a three-dimensional (3D) solvable lattice model with non-negative Boltzma...
The Heisenberg Model of the integrable evolution of a continuous spin chain can be used to describe ...
We obtain a new solution of the star-triangle relation with positive Boltzmann weights, which contai...
Abstract. Discrete integrable equations over finite fields are investigated. The indeter-minacy of t...
We classify all integrable three-dimensional scalar discrete affine linear equations Q3 = 0 on an el...
In this work we study the solutions of the Yang-Baxter equation associated to nineteen vertex models...
We present a discretization of the CP1 sigma model. We show that the discrete CP1 sigma model is des...
Finding appropriate notions of discrete holomorphic maps and, more generally, conformal immersions o...
Spectra and eigenfunctions of discrete hamiltonians are computed using algebraic, analytic and numer...
We investigate some classical evolution model in the discrete 2+1 space-time. A map, giving an one-s...
Abstract It is argued that the supersymmetric index of a certain system of branes in M-theory is equ...
We report progress in constructing Boltzmann weights for integrable 3-dimensional lattice spin model...
We report progress in constructing Boltzmann weights for integrable three-dimensional lattice spin m...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
It has recently been established that imposing the condition of discrete holomorphicity on a lattice...
In this paper we construct a three-dimensional (3D) solvable lattice model with non-negative Boltzma...
The Heisenberg Model of the integrable evolution of a continuous spin chain can be used to describe ...
We obtain a new solution of the star-triangle relation with positive Boltzmann weights, which contai...
Abstract. Discrete integrable equations over finite fields are investigated. The indeter-minacy of t...
We classify all integrable three-dimensional scalar discrete affine linear equations Q3 = 0 on an el...
In this work we study the solutions of the Yang-Baxter equation associated to nineteen vertex models...
We present a discretization of the CP1 sigma model. We show that the discrete CP1 sigma model is des...
Finding appropriate notions of discrete holomorphic maps and, more generally, conformal immersions o...
Spectra and eigenfunctions of discrete hamiltonians are computed using algebraic, analytic and numer...
We investigate some classical evolution model in the discrete 2+1 space-time. A map, giving an one-s...
Abstract It is argued that the supersymmetric index of a certain system of branes in M-theory is equ...