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| Detecting Multivariable Correlation with Maximal Information Entropy |
| Zhang Ya-hong Li Yu-jian Zhang Ting |
| (College of Computer Science Beijing University of Technology, Beijing 100124, China) |
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Abstract Many measures, e.g., Maximal Information Coefficient (MIC), are presented to identify interesting correlations for pairs of variables, but few for triplets or even for higher dimension variable set. Based on that, the Maximal Information Entropy (MIE) is proposed for measuring the general correlation of a multivariable data set. For k variables, firstly, the maximal information matrix is constructed according to the MIC scores of any pairs of variables; then, maximal information entropy, which measures the correlation degree of the concerned k variables, is calculated based on the maximal information matrix. The simulation experimental results show that MIE can detect one-dimensional manifold dependence of triplets. The applications to real datasets further verify the feasibility of MIE.
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Received: 09 January 2014
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Corresponding Authors:
Zhang Ya-hong
E-mail: plahpu@163.com
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2015, Vol. 37 
