AbstractApproximating the inference probability Pr[X = x | E = e] in any sense, even for a single evidence node E, is NP-hard. This result holds for belief networks that are allowed to contain extreme conditional probabilities—that is, conditional probabilities arbitrarily close to 0. Nevertheless, all previous approximation algorithms have failed to approximate efficiently many inferences, even for belief networks without extreme conditional probabilities.We prove that we can approximate efficiently probabilistic inference in belief networks without extreme conditional probabilities. We construct a randomized approximation algorithm—the bounded-variance algorithm—that is a variant of the known likelihood-weighting algorithm. The bounded-va...
We study two-layer belief networks of binary random variables in which the conditional probabilities...
Exact inference in large, densely connected probabilistic networks is computa-tionally intractable, ...
Computing marginal probabilities (whether prior or posterior) in Bayesian belief networks is a hard ...
Approximating the inference probability Pr[X = xjE = e] in any sense, even for a single evidence nod...
AbstractProbabilistic inference and maximum a posteriori (MAP) explanation are two important and rel...
Computation of marginal probabilities in Bayesian Belief Networks is central to many probabilistic r...
AbstractA number of exact algorithms have been developed in recent years to perform probabilistic in...
Computing posterior and marginal probabilities constitutes the backbone of almost all inferences in ...
Contains fulltext : 160422.pdf (publisher's version ) (Open Access)Computing poste...
We present a unifying framework for exact and approximate inference in Bayesian networks. This frame...
AbstractCutset conditioning and clique-tree propagation are two popular methods for exact probabilis...
This paper describes a class of probabilistic approximation algorithms based on bucket elimination w...
This paper describes a general scheme for accomodating different types of conditional distributions ...
Bayesian networks are gaining an increasing popularity as a modeling tool for complex problems invol...
Bayesian networks provide a useful mechanism for encoding and reasoning about uncertainty. Recent pr...
We study two-layer belief networks of binary random variables in which the conditional probabilities...
Exact inference in large, densely connected probabilistic networks is computa-tionally intractable, ...
Computing marginal probabilities (whether prior or posterior) in Bayesian belief networks is a hard ...
Approximating the inference probability Pr[X = xjE = e] in any sense, even for a single evidence nod...
AbstractProbabilistic inference and maximum a posteriori (MAP) explanation are two important and rel...
Computation of marginal probabilities in Bayesian Belief Networks is central to many probabilistic r...
AbstractA number of exact algorithms have been developed in recent years to perform probabilistic in...
Computing posterior and marginal probabilities constitutes the backbone of almost all inferences in ...
Contains fulltext : 160422.pdf (publisher's version ) (Open Access)Computing poste...
We present a unifying framework for exact and approximate inference in Bayesian networks. This frame...
AbstractCutset conditioning and clique-tree propagation are two popular methods for exact probabilis...
This paper describes a class of probabilistic approximation algorithms based on bucket elimination w...
This paper describes a general scheme for accomodating different types of conditional distributions ...
Bayesian networks are gaining an increasing popularity as a modeling tool for complex problems invol...
Bayesian networks provide a useful mechanism for encoding and reasoning about uncertainty. Recent pr...
We study two-layer belief networks of binary random variables in which the conditional probabilities...
Exact inference in large, densely connected probabilistic networks is computa-tionally intractable, ...
Computing marginal probabilities (whether prior or posterior) in Bayesian belief networks is a hard ...