Functional Multiple-Set Canonical Correlation Analysis

被引:0
|
作者
Heungsun Hwang
Kwanghee Jung
Yoshio Takane
Todd S. Woodward
机构
[1] McGill University,Department of Psychology
[2] McGill University,undefined
[3] University of British Columbia and British Columbia Mental Health and Addiction Research Institute,undefined
来源
Psychometrika | 2012年 / 77卷
关键词
functional data; multiple-set canonical correlation analysis; functional canonical correlation analysis; functional magnetic resonance imaging data;
D O I
暂无
中图分类号
学科分类号
摘要
We propose functional multiple-set canonical correlation analysis for exploring associations among multiple sets of functions. The proposed method includes functional canonical correlation analysis as a special case when only two sets of functions are considered. As in classical multiple-set canonical correlation analysis, computationally, the method solves a matrix eigen-analysis problem through the adoption of a basis expansion approach to approximating data and weight functions. We apply the proposed method to functional magnetic resonance imaging (fMRI) data to identify networks of neural activity that are commonly activated across subjects while carrying out a working memory task.
引用
收藏
页码:48 / 64
页数:16
相关论文
共 50 条
  • [21] Data reduction for multiple functional data with class information
    Jung, Uk
    Jeong, Myong K.
    Lu, Jye-Chyi
    INTERNATIONAL JOURNAL OF PRODUCTION RESEARCH, 2006, 44 (14) : 2695 - 2710
  • [22] Sensitivity analysis in functional principal component analysis
    Yoshihiro Yamanishi
    Yutaka Tanaka
    Computational Statistics, 2005, 20 : 311 - 326
  • [23] Variable selection for multivariate functional data via conditional correlation learning
    Wang, Keyao
    Wang, Huiwen
    Wang, Shanshan
    Wang, Lihong
    COMPUTATIONAL STATISTICS, 2024, 39 (04) : 2375 - 2412
  • [24] Functional variable selection via Gram-Schmidt orthogonalization for multiple functional linear regression
    Liu, Ruiping
    Wang, Huiwen
    Wang, Shanshan
    JOURNAL OF STATISTICAL COMPUTATION AND SIMULATION, 2018, 88 (18) : 3664 - 3680
  • [25] Functional Extended Redundancy Analysis
    Hwang, Heungsun
    Suk, Hye Won
    Lee, Jang-Han
    Moskowitz, D. S.
    Lim, Jooseop
    PSYCHOMETRIKA, 2012, 77 (03) : 524 - 542
  • [26] Sensitivity analysis in functional principal component analysis
    Yamanishi, Y
    Tanaka, Y
    COMPUTATIONAL STATISTICS, 2005, 20 (02) : 311 - 326
  • [27] Functional Extended Redundancy Analysis
    Heungsun Hwang
    Hye Won Suk
    Jang-Han Lee
    D. S. Moskowitz
    Jooseop Lim
    Psychometrika, 2012, 77 : 524 - 542
  • [28] Functional singular component analysis based functional additive models
    ZHANG Tao
    WANG QiHua
    Science China(Mathematics), 2016, 59 (12) : 2443 - 2462
  • [29] Functional singular component analysis based functional additive models
    Tao Zhang
    QiHua Wang
    Science China Mathematics, 2016, 59 : 2443 - 2462
  • [30] Functional singular component analysis based functional additive models
    Zhang Tao
    Wang QiHua
    SCIENCE CHINA-MATHEMATICS, 2016, 59 (12) : 2443 - 2462
12345