Add to ORKGWe show that the canonical random-cluster measure associated to isoradial graphs is critical for all q≥1. Additionally, we prove that the phase transition of the model is of the same type on all isoradial graphs: continuous for 1≤q≤4 and discontinuous for q>4. For 1≤q≤4, the arm exponents (assuming their existence) are shown to be the same for all isoradial graphs. In particular, these properties also hold on the triangular and hexagonal lattices. Our results also include the limiting case of quantum random- cluster models in 1+1 dimensions
The abrupt change of the size of the largest connected component is a central quantity of interest i...
For ∆ ≥ 5 and q large as a function of ∆, we give a detailed picture of the phase transition of the...
27 pages, 10 figuresWe prove a long-standing conjecture on random-cluster models, namely that the cr...
Abstract. Critical points and singularities are encountered in the study of critical phenomena in pr...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
We prove sharpness of the phase transition for the random-cluster model with q≥1 on graphs of the f...
The random-cluster model of Fortuin and Kasteleyn contains as special cases the percolation, Ising, ...
The random-cluster model is a dependent percolation model that has applications in the study of Isi...
In this thesis, we study the consequences of the expression of the six-vertex model free energy on t...
In this thesis, we study the consequences of the expression of the six-vertex model free energy on t...
AbstractThe random cluster model on a general infinite graph with bounded degree wired at infinity i...
Cette thèse comprend deux parties : la première portant sur l'universalité du modèle de random-clust...
AbstractThe random cluster model on a general infinite graph with bounded degree wired at infinity i...
22 pagesIsoradial graphs are a natural generalization of regular graphs which give, for many models ...
The abrupt change of the size of the largest connected component is a central quantity of interest i...
For ∆ ≥ 5 and q large as a function of ∆, we give a detailed picture of the phase transition of the...
27 pages, 10 figuresWe prove a long-standing conjecture on random-cluster models, namely that the cr...
Abstract. Critical points and singularities are encountered in the study of critical phenomena in pr...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
We prove sharpness of the phase transition for the random-cluster model with q≥1 on graphs of the f...
The random-cluster model of Fortuin and Kasteleyn contains as special cases the percolation, Ising, ...
The random-cluster model is a dependent percolation model that has applications in the study of Isi...
In this thesis, we study the consequences of the expression of the six-vertex model free energy on t...
In this thesis, we study the consequences of the expression of the six-vertex model free energy on t...
AbstractThe random cluster model on a general infinite graph with bounded degree wired at infinity i...
Cette thèse comprend deux parties : la première portant sur l'universalité du modèle de random-clust...
AbstractThe random cluster model on a general infinite graph with bounded degree wired at infinity i...
22 pagesIsoradial graphs are a natural generalization of regular graphs which give, for many models ...
The abrupt change of the size of the largest connected component is a central quantity of interest i...
For ∆ ≥ 5 and q large as a function of ∆, we give a detailed picture of the phase transition of the...
27 pages, 10 figuresWe prove a long-standing conjecture on random-cluster models, namely that the cr...