K-medoids inverse regression |
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| Authors: | Michael J. Brusco Douglas Steinley Jordan Stevens |
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| Affiliation: | 1. Department of Business Analytics, Information Systems, and Supply Chain, Florida State University, Tallahassee, Florida, USA;2. mbrusco@business.fsu.edu;4. Department of Psychological Sciences, University of Missouri, Columbia, Missouri, USA |
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| Abstract: | AbstractK-means inverse regression was developed as an easy-to-use dimension reduction procedure for multivariate regression. This approach is similar to the original sliced inverse regression method, with the exception that the slices are explicitly produced by a K-means clustering of the response vectors. In this article, we propose K-medoids clustering as an alternative clustering approach for slicing and compare its performance to K-means in a simulation study. Although the two methods often produce comparable results, K-medoids tends to yield better performance in the presence of outliers. In addition to isolation of outliers, K-medoids clustering also has the advantage of accommodating a broader range of dissimilarity measures, which could prove useful in other graphical regression applications where slicing is required. |
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| Keywords: | Central subspaces dimension reduction K-means clustering K-medoids clustering multivariate regression sliced inverse regression |
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