Jhonatan S. Oliveira scite author profile

Jhonatan S. Oliveira

5Publications

14Citation Statements Received

32Citation Statements Given

How they've been cited

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Affiliations

University of Regina

Publications

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A Simple Method for Testing Independencies in Bayesian Networks

Butz¹,

Santos²,

Oliveira³

et al. 2016

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Testing independencies is a fundamental task in reasoning with Bayesian networks (BNs). In practice, d‐separation is often used for this task, since it has linear‐time complexity. However, many have had difficulties understanding d‐separation in BNs. An equivalent method that is easier to understand, called m‐separation, transforms the problem from directed separation in BNs into classical separation in undirected graphs. Two main steps of this transformation are pruning the BN and adding undirected edges. In this paper, we propose u‐separation as an even simpler method for testing independencies in a BN. Our approach also converts the problem into classical separation in an undirected graph. However, our method is based upon the novel concepts of inaugural variables and rationalization. Thereby, the primary advantage of u‐separation over m‐separation is that m‐separation can prune unnecessarily and add superfluous edges. Our experiment results show that u‐separation performs 73% fewer modifications on average than m‐separation.

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Darwinian Networks

Butz¹,

Oliveira²,

Santos³

2015

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On learning the structure of sum-product networks

Butz

Oliveira

Santos

2017

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Bayesian network inference using marginal trees

Butz

Oliveira

Madsen

2016

International Journal of Approximate Reasoning

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Variable elimination (VE) and join tree propagation (JTP) are two alternatives to inference in Bayesian networks (BNs). VE, which can be viewed as one-way propagation in a join tree, answers each query against the BN meaning that computation can be repeated. On the other hand, answering a single query with JTP involves two-way propagation, of which some computation may remain unused. In this paper, we propose marginal tree inference (MTI) as a new approach to exact inference in discrete BNs. MTI seeks to avoid recomputation, while at the same time ensuring that no constructed probability information remains unused. Thereby, MTI stakes out middle ground between VE and JTP. The usefulness of MTI is demonstrated in multiple probabilistic reasoning sessions.

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On Tree Structures Used by Simple Propagation

Madsen

Butz

Oliveira

et al. 2016

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