Add to ORKGWe study the metastable minima of the Curie–Weiss Potts model with three states, as a function of the inverse temperature, and for arbitrary vector-valued external fields. Extending the classic work of Ellis and Wang (Stoch Process Appl 35(1):59–79, 1990) and Wang (Stoch Process Appl 50(2):245–252, 1994) we use singularity theory to provide the global structure of metastable (or local) minima. In particular, we show that the free energy has up to four local minimizers (some of which may at the same time be global) and describe the bifurcation geometry of their transitions under variation of the parameters
We consider the Curie–Weiss Potts model in zero external field under independent symmetric spin-flip...
The study of systems with multiple (not necessarily degenerate) metastable states presents subtle di...
We study the finite dimensional marginals of the Gibbs measure in the Hopfield model at low temperat...
AbstractWe numerically study the metastable states of the 2d Potts model. Both of equilibrium and re...
For the first order transition of the Ising model below Tc, Isakov has proven that the free energy ...
We consider the ferromagnetic q-state Potts model on a finite grid graph with non-zero external fiel...
We study the metastable equilibrium properties of the two-dimensional Potts model with heat-bath tra...
We consider the Potts model on a two-dimensional periodic rectangular lattice with general coupling ...
In this article, we investigate the energy landscape and metastable behavior of the Ising and Potts ...
Abstract.- We present a study of phase transitions of the mean–field Potts model at (inverse) temper...
We present a study of phase transitions of the mean-field Potts model at (inverse) temperature β, in...
The variational problem for the Curie--Weiss--Potts model is solved completely. The results extend t...
Abstract We consider mass-constrained minimizers for a class of non-convex energy functionals involv...
The Curie-Weiss Potts model is a mean field version of the well-known Potts model. In this model, th...
We construct the exact partition function of the Potts model on a complete graph subject to external...
We consider the Curie–Weiss Potts model in zero external field under independent symmetric spin-flip...
The study of systems with multiple (not necessarily degenerate) metastable states presents subtle di...
We study the finite dimensional marginals of the Gibbs measure in the Hopfield model at low temperat...
AbstractWe numerically study the metastable states of the 2d Potts model. Both of equilibrium and re...
For the first order transition of the Ising model below Tc, Isakov has proven that the free energy ...
We consider the ferromagnetic q-state Potts model on a finite grid graph with non-zero external fiel...
We study the metastable equilibrium properties of the two-dimensional Potts model with heat-bath tra...
We consider the Potts model on a two-dimensional periodic rectangular lattice with general coupling ...
In this article, we investigate the energy landscape and metastable behavior of the Ising and Potts ...
Abstract.- We present a study of phase transitions of the mean–field Potts model at (inverse) temper...
We present a study of phase transitions of the mean-field Potts model at (inverse) temperature β, in...
The variational problem for the Curie--Weiss--Potts model is solved completely. The results extend t...
Abstract We consider mass-constrained minimizers for a class of non-convex energy functionals involv...
The Curie-Weiss Potts model is a mean field version of the well-known Potts model. In this model, th...
We construct the exact partition function of the Potts model on a complete graph subject to external...
We consider the Curie–Weiss Potts model in zero external field under independent symmetric spin-flip...
The study of systems with multiple (not necessarily degenerate) metastable states presents subtle di...
We study the finite dimensional marginals of the Gibbs measure in the Hopfield model at low temperat...