Add to ORKGStatistical physics models with hard constraints, such as the discrete hard-core gas model (random independent sets in a graph), are inherently combinatorial and present the discrete mathematician with a relatively comfortable setting for the study of phase transition. In this paper we survey recent work (concentrating on joint work of the authors) in which hard-constraint systems are modeled by the space $\hom(G,H)$ of homomorphisms from an infinite graph $G$ to a fixed finite constraint graph $H$. These spaces become sufficiently tractable when $G$ is a regular tree (often called a Cayley tree or Bethe lattice) to permit characterization of the constraint graphs $H$ which admit multiple invariant Gibbs measures. Applications to a physics ...
A 1-2 model is a probability measure on subgraphs of a hexagonal lattice, satisfying the condition t...
The graph theoretic concept of maximal independent set arises in several practical problems in compu...
10 pages, Proceedings of the International Workshop on Statistical-Mechanical Informatics 2007, Kyot...
We model physical systems with “hard constraints” by the space Hom(G, H) of homomorphisms from a loc...
AbstractWe model physical systems with “hard constraints” by the space Hom(G, H) of homomorphisms fr...
An instance of a random constraint satisfaction problem defines a random subset S (the set of soluti...
Over the last few decades, there has been a growing interest in a measure-theoretical property of Gi...
Given a countable graph $\mathcal{G}$ and a finite graph $H$, we consider $Hom(\mathcal{G}, H)$ the ...
Optimization is fundamental in many areas of science, from computer science and information theory t...
We give two examples of nonmonotonic behavior in symmetric systems, exhibiting more than one critica...
9 pages, 2 figures, International Meeting on "Inference, Computation, and Spin Glasses" (ICSG2013), ...
Hom shifts form a class of multidimensional shifts of finite type (SFT) and consist of colorings of ...
© 2019, Institute of Mathematical Statistics. We formulate a continuous version of the well-known di...
Abstract. We consider homogeneous factor models on uniformly sparse graph sequences converging local...
We study constraint satisfaction problems on the so-called planted random ensemble. We show that for...
A 1-2 model is a probability measure on subgraphs of a hexagonal lattice, satisfying the condition t...
The graph theoretic concept of maximal independent set arises in several practical problems in compu...
10 pages, Proceedings of the International Workshop on Statistical-Mechanical Informatics 2007, Kyot...
We model physical systems with “hard constraints” by the space Hom(G, H) of homomorphisms from a loc...
AbstractWe model physical systems with “hard constraints” by the space Hom(G, H) of homomorphisms fr...
An instance of a random constraint satisfaction problem defines a random subset S (the set of soluti...
Over the last few decades, there has been a growing interest in a measure-theoretical property of Gi...
Given a countable graph $\mathcal{G}$ and a finite graph $H$, we consider $Hom(\mathcal{G}, H)$ the ...
Optimization is fundamental in many areas of science, from computer science and information theory t...
We give two examples of nonmonotonic behavior in symmetric systems, exhibiting more than one critica...
9 pages, 2 figures, International Meeting on "Inference, Computation, and Spin Glasses" (ICSG2013), ...
Hom shifts form a class of multidimensional shifts of finite type (SFT) and consist of colorings of ...
© 2019, Institute of Mathematical Statistics. We formulate a continuous version of the well-known di...
Abstract. We consider homogeneous factor models on uniformly sparse graph sequences converging local...
We study constraint satisfaction problems on the so-called planted random ensemble. We show that for...
A 1-2 model is a probability measure on subgraphs of a hexagonal lattice, satisfying the condition t...
The graph theoretic concept of maximal independent set arises in several practical problems in compu...
10 pages, Proceedings of the International Workshop on Statistical-Mechanical Informatics 2007, Kyot...