Tyler shape depth
成果类型:
Article
署名作者:
Paindaveine, D.; Van Bever, G.
署名单位:
Universite Libre de Bruxelles; University of Namur
刊物名称:
BIOMETRIKA
ISSN/ISSBN:
0006-3444
DOI:
10.1093/biomet/asz039
发表日期:
2019
页码:
913927
关键词:
multivariate location
scatter
distributions
covariance
invariant
inference
points
摘要:
In many problems from multivariate analysis, the parameter of interest is a shape matrix: a normalized version of the corresponding scatter or dispersion matrix. In this article we propose a notion of depth for shape matrices that involves data points only through their directions from the centre of the distribution. We refer to this concept as Tyler shape depth since the resulting estimator of shape, namely the deepest shape matrix, is the median-based counterpart of the M-estimator of shape due to Tyler (1987). Besides estimation, shape depth, like its Tyler antecedent, also allows hypothesis testing on shape. Its main benefit, however, lies in the ranking of the shape matrices it provides, the practical relevance of which is illustrated by applications to principal component analysis and shape-based outlier detection. We study the invariance, quasi-concavity and continuity properties of Tyler shape depth, the topological and boundedness properties of the corresponding depth regions, and the existence of a deepest shape matrix, and we prove Fisher consistency in the elliptical case. Finally, we derive a Glivenko-Cantelli-type result and establish almost sure consistency of the deepest shape matrix estimator.
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