References
- Borg , I. and Groenen , P. 1997 . Modern Multidimensional Scaling New York : Springer .
- Brito , M. R. , Quiroz , A. J. and Yukich , J. E. 2002 . Graph-theoretic procedures for dimension identification . J. Multivariate Anal. , 81 ( 1 ) : 67 – 84 .
- Devroye , L. , Györfi , L. and Lugosi , G. 1996 . A Probabilistic Theory of Pattern Recognition New York : Springer .
- Friedman , J. H. and Rafsky , L. C. 1979 . Multivariate generalizations of the Wald-Wolfowitz and Smirnov two-sample tests . Annals. Stat. , 17 : 697 – 717 .
- Friedman , J. H. and Rafsky , L. C. 1981 . Graphics for the multivariate two-sample problem . J. Am. Stat. Assoc. , 76 : 277 – 293 .
- Kruskal , J. B. 1964 . Nonmetric multidimensional scaling: a numerical method . Psychometrika , 29 : 115 – 129 .
- Kruskal , J. B. and Wish , M. 1978 . Multidimensional Scaling Beverly Hills, California : Sage Publications .
- Krzanowski , W. J. 1996 . Principles of Multivariate Analysis. A User's Perspective , Oxford Statistical Science Series Vol. 3 , Oxford University Press .
- Lee , S. 1997 . The central limit theorem for Euclidean minimal spanning trees I . Annals Appl. Probability , 7 ( 4 ) : 996 – 1020 .
- Lee , S. 1999 . The central limit theorem for Euclidean minimal spanning trees II . Adv. Appl. Probability , 31 ( 4 ) : 969 – 984 .
- Rohlf , F. J. 1975 . Generalization of the gap test for the detection of multivariate outliers . Biometrics , 31 : 93 – 101 .
- Steele , J. M. , Shepp , L. A. and Eddy , W. F. 1987 . On the number of leaves of a Euclidean minimal spanning tree . J. Appl. Probability , 24 : 809 – 826 .
- Tabakis, E. (1992). Asymptotic and Computational Problems in Single-link Clustering. Ph.D. thesis, Caracas: M.I.T
- Tabakis , E. 1996 . “ On the longest edge of the minimal spanning tree ” . In From Data to Knowledge Edited by: Gaul , W. and Pfeifer , D. 222 – 230 . New York : Springer .
- Zahn , C. T. 1971 . Graph-theoretical methods for detecting and describing Gestalt clusters . IEEE Trans. Comput. C , 20 : 68 – 86 .