DISSIMILARITY AND RELATED METHODS FOR FUNCTIONAL DATA(Functional Data Analysis)
スポンサーリンク
概要
- 論文の詳細を見る
Functional data analysis, as proposed by Ramsay (1982), has been attracting many researchers. The most popular approach in recent studies of functional data has been to extend the statistical methods for usual data to functional data. Ramsay and Silverman (1997), for example, proposed regression analysis, principal component analysis, canonical correlation analysis, linear models, etc. for functional data. In this paper, we propose several dissimilarities of functional data. We discuss comparison of these dissimilarities by using the cophenetic correlation coefficient and the sum of squares. Our concern is the effect of dissimilarity on the result of analysis that is applied to dissimilarity data; e.g., cluster analysis.
- 日本計算機統計学会の論文
著者
-
Inada Koichi
Department Of Mathematics And Computer Science Kagoshima University
-
Tokushige Shuichi
Graduate School of Science and Engineering, Kagoshima University
-
Yadohisa Hiroshi
Department of Mathematics and Computer Science, Kagoshima University
-
Yadohisa Hiroshi
Department Of Mathematics And Computer Science Kagoshima University
-
Tokushige Shuichi
Graduate School Of Science And Engineering Kagoshima University
-
Yadohisa Hiroshi
Department Of Culture And Information Science Doshisha University
関連論文
- DISSIMILARITY AND RELATED METHODS FOR FUNCTIONAL DATA(Functional Data Analysis)
- SPACE DISTORTION AND MONOTONE ADMISSIBILITY IN AGGLOMERATIVE CLUSTERING
- A SHRINKAGE ESTIMATOR OF THE BIVARIATE NORMAL MEAN WITH INTERVAL RESTRICTIONS
- Characterization and comparison of Japan professional football clubs based on attack patterns(Session 2a)
- Pitching Prediction By Multinomial Logit Model In Nippon Professional Baseball(Session 2a)
- Similarity measure for candlestick chart variable(Competition 2)