Ryoya Oda scite author profile

Ryoya Oda

5Publications

11Citation Statements Received

45Citation Statements Given

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Hiroshima University

Publications

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Asymptotic null and non-null distributions of test statistics for redundancy in high-dimensional canonical correlation analysis

Oda

Yanagihara

Fujikoshi

2018

Random Matrices: Theory Appl.

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In this paper, we derive asymptotic null and non-null distributions of three test statistics, namely, the likelihood ratio criterion, the Lawley–Hotelling criterion, and the Bartlett–Nanda–Pillai criterion, for tests of redundancy in high-dimensional (HD) canonical correlation analysis. Since our setting is that the dimension of one of two observation vectors may be large but does not exceed the sample size, we use a HD asymptotic framework such that the sample size and the dimension divided by the sample size tend to [Formula: see text] and a positive constant within [0,1), respectively, for evaluating asymptotic distributions. Through simulation experiments, it is shown that our proposed HD approximations are more accurate than those under the classical asymptotic framework, i.e. only the sample size tends to [Formula: see text].

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A consistent variable selection method in high-dimensional canonical discriminant analysis

Oda

Suzuki

Yanagihara

et al. 2020

Journal of Multivariate Analysis

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High-dimensional asymptotic behavior of the difference between the log-determinants of two Wishart matrices

Yanagihara

Oda

Hashiyama

et al. 2017

Journal of Multivariate Analysis

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A fast and consistent variable selection method for high-dimensional multivariate linear regression with a large number of explanatory variables

Oda¹,

Yanagihara²

2020

Electron. J. Statist.

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Consistent variable selection criteria in multivariate linear regression even when dimension exceeds sample size

Oda¹

2020

Hiroshima Math. J.

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This paper is concerned with the selection of explanatory variables in multivariate linear regression. The Akaike's information criterion and the C p criterion cannot perform in high-dimensional situations such that the dimension of a vector stacked with response variables exceeds the sample size. To overcome this, we consider two variable selection criteria based on an L 2 squared distance with a weighted matrix, namely the scalar-type generalized C p criterion and the ridge-type generalized C p criterion. We clarify conditions for their consistency under a hybrid-ultra-highdimensional asymptotic framework such that the sample size always goes to infinity but the number of response variables may not go to infinity. Numerical experiments show that the probabilities of selecting the true subset by criteria satisfying consistency conditions are high even when the dimension is larger than the sample size. Finally, we illuminate the practical utility of these criteria using empirical data.

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Ryoya Oda

Asymptotic null and non-null distributions of test statistics for redundancy in high-dimensional canonical correlation analysis

A consistent variable selection method in high-dimensional canonical discriminant analysis

High-dimensional asymptotic behavior of the difference between the log-determinants of two Wishart matrices

A fast and consistent variable selection method for high-dimensional multivariate linear regression with a large number of explanatory variables

Consistent variable selection criteria in multivariate linear regression even when dimension exceeds sample size

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