AbstractA new approximation of the cluster variational method is introduced for the three-dimensional Ising model on the simple cubic lattice. The maximal cluster is, as far as we know, the largest ever used in this method. A message-passing algorithm, generalized belief propagation, is used to minimize the variational free energy. Convergence properties and performance of the algorithm are investigated.The approximation is used to compute the spontaneous magnetization, which is then compared to previous results. Using the present results as the last step in a sequence of three cluster variational approximations, an extrapolation is obtained which captures the leading critical behavior with a good accuracy
We present and solve the replica symmetric equations in the context of the replica cluster variation...
Important inference problems in statistical physics, computer vision, error-correcting coding theory...
A multispin coding program for site-diluted Ising models on large simple cubic lattices is described...
A new approximation of the cluster variational method is introduced for the three-dimensional Ising ...
Abstract. The cluster variation method has been developed into a general theoretical framework for t...
We study the performance of different message passing algorithms in the two-dimensional Edwards-Ande...
The Belief Propagation algorithm is a popular technique of solving inference problems for different ...
We first present an empirical study of the Belief Propagation (BP) algorithm, when run on the random...
We report about a new variational method [9] which approximates in a hierarchical way the random Isi...
We study a novel variational approach to solve the dynamics of Ising-like discrete spin systems. The...
When we consider application of Ising models to some problems for information processing, we have a ...
Replica-Symmetry-Breaking ansatz in the context of Kikuchi’s Cluster Variational Method (CVM). Using...
We introduce a new variational approach to the stationary state of kinetic Ising-like models. The ap...
Computing the partition function $Z$ of a discrete graphical model is a fundamental inference challe...
Computing the partition function Z of a discrete graphical model is a fundamental inference challeng...
We present and solve the replica symmetric equations in the context of the replica cluster variation...
Important inference problems in statistical physics, computer vision, error-correcting coding theory...
A multispin coding program for site-diluted Ising models on large simple cubic lattices is described...
A new approximation of the cluster variational method is introduced for the three-dimensional Ising ...
Abstract. The cluster variation method has been developed into a general theoretical framework for t...
We study the performance of different message passing algorithms in the two-dimensional Edwards-Ande...
The Belief Propagation algorithm is a popular technique of solving inference problems for different ...
We first present an empirical study of the Belief Propagation (BP) algorithm, when run on the random...
We report about a new variational method [9] which approximates in a hierarchical way the random Isi...
We study a novel variational approach to solve the dynamics of Ising-like discrete spin systems. The...
When we consider application of Ising models to some problems for information processing, we have a ...
Replica-Symmetry-Breaking ansatz in the context of Kikuchi’s Cluster Variational Method (CVM). Using...
We introduce a new variational approach to the stationary state of kinetic Ising-like models. The ap...
Computing the partition function $Z$ of a discrete graphical model is a fundamental inference challe...
Computing the partition function Z of a discrete graphical model is a fundamental inference challeng...
We present and solve the replica symmetric equations in the context of the replica cluster variation...
Important inference problems in statistical physics, computer vision, error-correcting coding theory...
A multispin coding program for site-diluted Ising models on large simple cubic lattices is described...