论文信息 - Two Partitional Methods for Interval-Valued Data Using Mahalanobis Distances

Two Partitional Methods for Interval-Valued Data Using Mahalanobis Distances

Two dynamic cluster methods for interval data are presented: the first method furnish a partition of the input data and a corresponding prototype (a vector of intervals) for each class by optimizing an adequacy criterion based on Mahalanobis distances between vectors of intervals and the second is an adaptive version of the first method. In order to show the usefulness of these methods, synthetic and real interval data sets considered. The synthetic interval data sets are obtained from quantitative data sets drawn according to bi-variate normal distributions. The adaptive method outperforms the non-adaptive one concerning the average behaviour of a cluster quality measure.

Francisco de A. T. de Carvalho | Renata M. C. R. de Souza | Camilo P. Tenorio | F. D. Carvalho | R. D. Souza

[1] Hans-Hermann Bock,et al. Analysis of Symbolic Data , 2000 .

[2] Hans-Hermann Bock,et al. Analysis of Symbolic Data: Exploratory Methods for Extracting Statistical Information from Complex Data , 2000 .

[3] Francisco de A. T. de Carvalho,et al. Clustering of interval data based on city-block distances , 2004, Pattern Recognit. Lett..

[4] Yves Lechevallier,et al. Dynamical Clustering of Interval Data: Optimization of an Adequacy Criterion Based on Hausdorff Distance , 2002 .

[5] G. De Soete,et al. Clustering and Classification , 2019, Data-Driven Science and Engineering.

[6] G. W. Milligan,et al. CLUSTERING VALIDATION: RESULTS AND IMPLICATIONS FOR APPLIED ANALYSES , 1996 .

[7] Anil K. Jain,et al. Data clustering: a review , 1999, CSUR.