The chief aim of this paper is to propose mean-field approximations for a broad class of Belief networks, of which sigmoid and noisy-or networks can be seen as special cases. The approximations are based on a powerful mean-field theory suggested by Plefka. We show that Saul, Jaakkola, and Jordan's approach is the first order approximation in Plefka's approach, via a variational derivation. The application of Plefka's theory to belief networks is not computationally tractable. To tackle this problem we propose new approximations based on Taylor series. Small scale experiements show that the proposed schemes are attractive
Abstract-We present a joint message passing approach that combines belief propagation and the mean f...
The problem of approximating a probability distribution occurs frequently in many areas of applied m...
We present a joint message passing approach that combines belief propagation and the mean field appr...
The chief aim of this paper is to propose mean-eld approximations for a broad class of Belief networ...
We develop a mean eld theory for sigmoid belief networks based on ideas from statistical mechanics. ...
Exact inference in large, densely connected probabilistic networks is computa-tionally intractable, ...
We develop a mean field theory for sigmoid belief networks based on ideas from statistical mechanics...
Exact inference in densely connected Bayesian networks is computation-ally intractable, and so there...
Exact inference in densely connected Bayesian networks is computationally intractable, and so there ...
We present a systematic approach to mean field theory (MFT) in a general probabilistic setting witho...
Bayesian belief networks can represent the complicated probabilistic processes that form natural sen...
The mean field algorithm is a widely used approximate inference algorithm for graphical models whose...
The mean field algorithm is a widely used approximate inference algorithm for graphical models whose...
In this paper, we derive a second order mean field theory for directed graphical probability models....
Mean-field analysis is an important tool for understanding dynamics on complex networks. However, su...
Abstract-We present a joint message passing approach that combines belief propagation and the mean f...
The problem of approximating a probability distribution occurs frequently in many areas of applied m...
We present a joint message passing approach that combines belief propagation and the mean field appr...
The chief aim of this paper is to propose mean-eld approximations for a broad class of Belief networ...
We develop a mean eld theory for sigmoid belief networks based on ideas from statistical mechanics. ...
Exact inference in large, densely connected probabilistic networks is computa-tionally intractable, ...
We develop a mean field theory for sigmoid belief networks based on ideas from statistical mechanics...
Exact inference in densely connected Bayesian networks is computation-ally intractable, and so there...
Exact inference in densely connected Bayesian networks is computationally intractable, and so there ...
We present a systematic approach to mean field theory (MFT) in a general probabilistic setting witho...
Bayesian belief networks can represent the complicated probabilistic processes that form natural sen...
The mean field algorithm is a widely used approximate inference algorithm for graphical models whose...
The mean field algorithm is a widely used approximate inference algorithm for graphical models whose...
In this paper, we derive a second order mean field theory for directed graphical probability models....
Mean-field analysis is an important tool for understanding dynamics on complex networks. However, su...
Abstract-We present a joint message passing approach that combines belief propagation and the mean f...
The problem of approximating a probability distribution occurs frequently in many areas of applied m...
We present a joint message passing approach that combines belief propagation and the mean field appr...