The geometry of the affine invariant multivariate sign and rank methods

被引:11
|
作者
Hettmansperger, TP
Möttönen, J
Oja, H
机构
[1] Penn State Univ, Dept Stat, University Pk, PA 16802 USA
[2] Univ Oulu, Dept Math Sci Stat, Oulu, Finland
来源
JOURNAL OF NONPARAMETRIC STATISTICS | 1999年 / 11卷 / 1-3期
关键词
hyperplane; L-1; methods; multivariate median; multivariate rank test; multivariate sign test; robustness;
D O I
10.1080/10485259908832784
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
For k-variate data sets, hyperplanes determined by the k-subsets of observations and the normals of these hyperplanes are discussed. Their use in defining multi-variate invariant concepts of sign and rank and multivariate median (based on the Oja criterion) as well as in the computation of these methods is illustrated.
引用
收藏
页码:271 / 285
页数:15
相关论文
共 50 条
  • [31] Affine geometry of modules over a ring with invariant basis number
    Lashkhi, A. A.
    Kvirikashvili, T. G.
    [J]. MATHEMATICAL NOTES, 2007, 82 (5-6) : 756 - 765
  • [32] Affine geometry of modules over a ring with an invariant basis number
    Lashkhi A.
    Kvirikashvili T.
    [J]. Journal of Mathematical Sciences, 2006, 137 (5) : 5161 - 5173
  • [33] Extraction method of a segment length ratio affine geometry invariant
    Huang, Bo
    Zhao, Xiao-Hui
    Shi, Gong-Tao
    Zhao, Ji-Yin
    Chen, Tao
    [J]. Zhao, X.-H. (xhzhao@jlu.edu.cn), 1600, Editorial Board of Jilin University (43): : 497 - 503
  • [34] AN AFFINE INVARIANT-THEORY AND ITS APPLICATION IN COMPUTATIONAL GEOMETRY
    SU, BC
    LIU, DY
    [J]. SCIENTIA SINICA SERIES A-MATHEMATICAL PHYSICAL ASTRONOMICAL & TECHNICAL SCIENCES, 1983, 26 (03): : 259 - 272
  • [35] Affine geometry of modules over a ring with invariant basis number
    A. A. Lashkhi
    T. G. Kvirikashvili
    [J]. Mathematical Notes, 2007, 82 : 756 - 765
  • [36] An affine invariant rank-based method for comparing dependent groups
    Wilcox, RR
    [J]. BRITISH JOURNAL OF MATHEMATICAL & STATISTICAL PSYCHOLOGY, 2005, 58 : 33 - 42
  • [37] LOW-RANK SIFT: AN AFFINE INVARIANT FEATURE FOR PLACE RECOGNITION
    Yang, Harry
    Cai, Shengnan
    Wang, Jingdong
    Quan, Long
    [J]. 2014 IEEE INTERNATIONAL CONFERENCE ON IMAGE PROCESSING (ICIP), 2014, : 5731 - 5735
  • [38] A criterion for density of the isoperiodic leaves in rank one affine invariant orbifolds
    Ygouf, Florent
    [J]. JOURNAL OF TOPOLOGY, 2023, 16 (01) : 1 - 19
  • [39] Affine-Invariant Online Optimization and the Low-rank Experts Problem
    Koren, Tomer
    Livni, Roi
    [J]. ADVANCES IN NEURAL INFORMATION PROCESSING SYSTEMS 30 (NIPS 2017), 2017, 30
  • [40] Inference based on the affine invariant multivariate Mann-Whitney-Wilcoxon statistic
    Topchii, A
    Tyurin, Y
    Oja, H
    [J]. JOURNAL OF NONPARAMETRIC STATISTICS, 2003, 15 (4-5) : 403 - 419
12345