Add to ORKGSummary: We examine crossing probabilities and free energies for conformally invariant critical 2-D systems in rectangular geometries, derived via conformal field theory and stochastic Löwner evolution methods. These quantities are shown to exhibit interesting modular behavior, although the physical meaning of modular transformations in this context is not clear. We show that in many cases these functions are completely characterized by very simple transformation properties. In particular, Cardy's function for the percolation crossing probability (including the conformal dimension 1/3), follows from a simple modular argument. A new type of ``higher-order modular form" arises and its properties are discussed briefly
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
38 pages, 3 figuresStochastic Loewner evolutions (SLE) are random growth processes of sets, called h...
We study the large class of solvable lattice models, based on the data of conformal field theory. ...
We consider the three crossing probability densities for percolation recently found via conformal fi...
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
Abstract. We prove that crossing probabilities for the critical planar Ising model with free boundar...
2The aim of the paper is to present numerical results supporting the presence of conformal invarianc...
We prove that crossing probabilities for the critical planar Ising model with free boundary conditio...
The logarithmic conformal field theory describing critical percolation is further explored using Wat...
The geometrical explanation of universality in terms of fixed points of renormalization-group transf...
We consider two-dimensional percolation in the scaling limit close to criticality and use integrable...
PACS. 64.60.Ak – Renormalization-group, fractal, and percolation studies of phase transi-tions. PACS...
Abstract. We consider the FK-Ising model in two dimensions at criticality. We obtain bounds on cross...
This thesis explores critical two-dimensional percolation in bounded regions in the continuum limit....
Six percolation models in two dimensions are studied: percolation by sites and by bonds on square, h...
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
38 pages, 3 figuresStochastic Loewner evolutions (SLE) are random growth processes of sets, called h...
We study the large class of solvable lattice models, based on the data of conformal field theory. ...
We consider the three crossing probability densities for percolation recently found via conformal fi...
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
Abstract. We prove that crossing probabilities for the critical planar Ising model with free boundar...
2The aim of the paper is to present numerical results supporting the presence of conformal invarianc...
We prove that crossing probabilities for the critical planar Ising model with free boundary conditio...
The logarithmic conformal field theory describing critical percolation is further explored using Wat...
The geometrical explanation of universality in terms of fixed points of renormalization-group transf...
We consider two-dimensional percolation in the scaling limit close to criticality and use integrable...
PACS. 64.60.Ak – Renormalization-group, fractal, and percolation studies of phase transi-tions. PACS...
Abstract. We consider the FK-Ising model in two dimensions at criticality. We obtain bounds on cross...
This thesis explores critical two-dimensional percolation in bounded regions in the continuum limit....
Six percolation models in two dimensions are studied: percolation by sites and by bonds on square, h...
Using conformal field theory, we derive several new crossing formulae at the two-dimensional percola...
38 pages, 3 figuresStochastic Loewner evolutions (SLE) are random growth processes of sets, called h...
We study the large class of solvable lattice models, based on the data of conformal field theory. ...