Add to ORKGWe derive the exact actions of the $Q$-state Potts model valid on any graph, first for the spin degrees of freedom, and second for the Fortuin-Kasteleyn clusters. In both cases the field is a traceless $Q$-component scalar field $\Phi^\alpha$. For the Ising model ($Q=2$), the field theory for the spins has upper critical dimension $d_{\rm c}^{\rm spin}=4$, whereas for the clusters it has $d_{\rm c}^{\rm cluster}=6$. As a consequence, the probability for three points to be in the same cluster is not given by mean-field theory theory for $d$ within $4<d<6$. We estimate the associated universal structure constant as $C=\sqrt{6-d}+ {\cal O}(6-d)^{3/2}$. This shows that some observables in the Ising model have an upper critical dimension of 4, w...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
Fortuin–Kastelyn clusters in the critical Q-state Potts model are conformally invariant fractals. We...
International audienceWe derive the exact actions of the $Q$-state Potts model valid on any graph, f...
The upper critical dimension of the Ising model is known to be $d_c=4$, above which critical behavio...
Besides its original spin representation, the Ising model is known to have the Fortuin-Kasteleyn (FK...
The lecture delivered at the \emph{Current Developments in Mathematics} conference (Harvard-MIT, 202...
29 pages, 11 FiguresInternational audienceWe have considered clusters of like spin in the Q-Potts mo...
We report on single-cluster Monte Carlo simulations of the Ising, 4-state Potts and 10-state Potts m...
We discuss the q-state Potts models for q q >= 2. We also note a curious appearance of the extended...
At the critical point in two dimensions, the number of percolation clusters of enclosed area greater...
Using the symmetric group <math altimg="si1.gif" xmlns="http://www.w3.org/1998/Math/MathML"><msub><m...
AbstractUsing the symmetric group SQ symmetry of the Q-state Potts model, we classify the (scalar) o...
The aim of this paper is to determine the behavior of the specific heat of the 4-dimensional Ising m...
At its critical point, the three-dimensional lattice Ising model is described by a conformal field t...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
Fortuin–Kastelyn clusters in the critical Q-state Potts model are conformally invariant fractals. We...
International audienceWe derive the exact actions of the $Q$-state Potts model valid on any graph, f...
The upper critical dimension of the Ising model is known to be $d_c=4$, above which critical behavio...
Besides its original spin representation, the Ising model is known to have the Fortuin-Kasteleyn (FK...
The lecture delivered at the \emph{Current Developments in Mathematics} conference (Harvard-MIT, 202...
29 pages, 11 FiguresInternational audienceWe have considered clusters of like spin in the Q-Potts mo...
We report on single-cluster Monte Carlo simulations of the Ising, 4-state Potts and 10-state Potts m...
We discuss the q-state Potts models for q q >= 2. We also note a curious appearance of the extended...
At the critical point in two dimensions, the number of percolation clusters of enclosed area greater...
Using the symmetric group <math altimg="si1.gif" xmlns="http://www.w3.org/1998/Math/MathML"><msub><m...
AbstractUsing the symmetric group SQ symmetry of the Q-state Potts model, we classify the (scalar) o...
The aim of this paper is to determine the behavior of the specific heat of the 4-dimensional Ising m...
At its critical point, the three-dimensional lattice Ising model is described by a conformal field t...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
We investigate a perturbatively renormalizable Sq invariant model with N = q − 1 scalar field compon...
Fortuin–Kastelyn clusters in the critical Q-state Potts model are conformally invariant fractals. We...