Add to ORKGWe define parafermionic observables in various lattice loop models, including examples where no Kramers-Wannier duality holds. For a particular rhombic embedding of the lattice in the plane and a value of the parafermionic spin these variables are discretely holomorphic (they satisfy a lattice version of the Cauchy-Riemann equations) as long as the Boltzmann weights satisfy certain linear constraints. In the cases considered, the weights then also satisfy the critical Yang-Baxter equations, with the spectral parameter being related linearly to the angle of the elementary rhombus. © 2009 IOP Publishing Ltd
© 2010 Dr. Anita Kristine PonsaingThis thesis is concerned with aspects of the integrable Temperley–...
Abstract. We introduce a new version of discrete holomorphic observables for the critical planar Isi...
Integrable boundary conditions are studied for critical A{D{E and general graph-based lattice models...
We define parafermionic observables in various lattice loop models, including examples where no Kram...
It has recently been established that imposing the condition of discrete holomorphicity on a lattice...
We consider boundary conditions compatible with discrete holomorphicity for the dilute O(n) and C lo...
The critical phases of two dimensional lattice models are widely believed to be described by conform...
We find discrete holomorphic parafermions of the Ashkin–Teller model on the critical line, by mappin...
We obtain a new solution of the star-triangle relation with positive Boltzmann weights, which contai...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
These lecture notes provide an (almost) self-contained account on conformal invariance of the planar...
This volume is based on the PhD thesis of the author. Through the examples of the self-avoiding walk...
The Faddeev-Volkov solution of the star-triangle relation is connected with the modular double of th...
The quantum integrability of a class of massive perturbations of the parafermionic conformal field t...
We provide a basic introduction to discrete-variable, rotor, and continuousvariable quantum phase sp...
© 2010 Dr. Anita Kristine PonsaingThis thesis is concerned with aspects of the integrable Temperley–...
Abstract. We introduce a new version of discrete holomorphic observables for the critical planar Isi...
Integrable boundary conditions are studied for critical A{D{E and general graph-based lattice models...
We define parafermionic observables in various lattice loop models, including examples where no Kram...
It has recently been established that imposing the condition of discrete holomorphicity on a lattice...
We consider boundary conditions compatible with discrete holomorphicity for the dilute O(n) and C lo...
The critical phases of two dimensional lattice models are widely believed to be described by conform...
We find discrete holomorphic parafermions of the Ashkin–Teller model on the critical line, by mappin...
We obtain a new solution of the star-triangle relation with positive Boltzmann weights, which contai...
The goal of this thesis is to present some novel results for solvable lattice models. In chapter 2 a...
These lecture notes provide an (almost) self-contained account on conformal invariance of the planar...
This volume is based on the PhD thesis of the author. Through the examples of the self-avoiding walk...
The Faddeev-Volkov solution of the star-triangle relation is connected with the modular double of th...
The quantum integrability of a class of massive perturbations of the parafermionic conformal field t...
We provide a basic introduction to discrete-variable, rotor, and continuousvariable quantum phase sp...
© 2010 Dr. Anita Kristine PonsaingThis thesis is concerned with aspects of the integrable Temperley–...
Abstract. We introduce a new version of discrete holomorphic observables for the critical planar Isi...
Integrable boundary conditions are studied for critical A{D{E and general graph-based lattice models...