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Discretization methods for Bayesian networks in the case of the earthquake

Devni Prima Sari, Dedi Rosadi, Adhitya Ronnie Effendie, Danardono Danardono

2020Bulletin of Electrical Engineering and Informatics10 citationsDOIOpen Access PDF

Abstract

The Bayesian networks are a graphical probability model that represents interactions between variables. This model has been widely applied in various fields, including in the case of disaster. In applying field data, we often find a mixture of variable types, which is a combination of continuous variables and discrete variables. For data processing using hybrid and continuous Bayesian networks, all continuous variables must be normally distributed. If normal conditions unsatisfied, we offer a solution, is to discretize continuous variables. Next, we can continue the process with the discrete Bayesian networks. The discretization of a variable can be done in various ways, including equal-width, equal-frequency, and K-means. The combination of BN and k-means is a new contribution in this study called the k-means Bayesian networks (KMBN) model. In this study, we compared the three methods of discretization used a confusion matrix. Based on the earthquake damage data, the K-means clustering method produced the highest level of accuracy. This result indicates that K-means is the best method for discretizing the data that we use in this study.

Topics & Concepts

DiscretizationBayesian networkBayesian probabilityComputer scienceCluster analysisVariable (mathematics)Field (mathematics)Data miningAlgorithmMathematicsMathematical optimizationArtificial intelligencePure mathematicsMathematical analysisData Mining and Machine Learning Applications
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