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- Srivastava M. S.
- Department of Statistics, University of Toronto
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説明
In this article, we develop a multivariate theory for analyzing multivariate datasets that have fewer observations than dimensions. More specifically, we consider the problem of testing the hypothesis that the mean vector μ of a p-dimensional random vector x is a zero vector where N, the number of independent observations on x, is less than the dimension p. It is assumed that x is normally distributed with mean vector μ and unknown nonsingular covariance matrix ∑. We propose the test statistic F+ = n−2 (p − n + 1) N ¯x′S+¯x, where n = N − 1 < p, ¯x and S are the sample mean vector and the sample covariance matrix respectively, and S+ is the Moore-Penrose inverse of S. It is shown that a suitably normalized version of the F+ statistic is asymptotically normally distributed under the hypothesis. The asymptotic non-null distribution in one sample case is given. The case when the covariance matrix ∑ is singular of rank r but the sample size N is larger than r is also considered. The corresponding results for the case of two-samples and k samples, known as MANOVA, are given.
収録刊行物
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- JOURNAL OF THE JAPAN STATISTICAL SOCIETY
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JOURNAL OF THE JAPAN STATISTICAL SOCIETY 37 (1), 53-86, 2007
日本統計学会
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詳細情報 詳細情報について
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- CRID
- 1390282680264485760
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- NII論文ID
- 110006317397
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- NII書誌ID
- AA1105098X
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- ISSN
- 13486365
- 18822754
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- MRID
- 2392485
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- NDL書誌ID
- 9304126
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- 本文言語コード
- en
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- データソース種別
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- JaLC
- NDL
- Crossref
- CiNii Articles
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- 抄録ライセンスフラグ
- 使用不可
