Title :
Generalized Expansion Dimension
Author :
Houle, Michael E. ; Kashima, Hideyuki ; Nett, Michael
Author_Institution :
Nat. Inst. of Inf., Tokyo, Japan
Abstract :
In this paper we propose a framework for modeling the intrinsic dimensionality of data sets. The models can be viewed as generalizations of the expansion dimension, which was originally proposed for the analysis of certain similarity search indices using the Euclidean distance metric. Here, we extend the original model to other metric spaces: vector spaces with the Lp or vector angle (cosine similarity) distance measures, as well as product spaces for categorical data. We also provide a practical guide for estimating both local and global intrinsic dimensionality. The estimates of data complexity can subsequently be used in the design and analysis of algorithms for data mining applications such as search, clustering, classification, and outlier detection.
Keywords :
data mining; Euclidean distance metric; categorical data; cosine similarity distance measures; data complexity estimation; data mining applications; data set intrinsic dimensionality; generalized expansion dimension; global intrinsic dimensionality; local intrinsic dimensionality; product spaces; similarity search index analysis; vector angle distance measures; vector spaces; Complexity theory; Data mining; Data models; Extraterrestrial measurements; Search problems; Vectors;
Conference_Titel :
Data Mining Workshops (ICDMW), 2012 IEEE 12th International Conference on
Conference_Location :
Brussels
Print_ISBN :
978-1-4673-5164-5
DOI :
10.1109/ICDMW.2012.94
