Tonda Tetsuji | Department Of Environmentrics And Biometrics Research Institute For Radiation Biology And Medicine H
スポンサーリンク
概要
- Tonda Tetsujiの詳細を見る
- 同名の論文著者
- Department Of Environmentrics And Biometrics Research Institute For Radiation Biology And Medicine Hの論文著者
関連著者
-
Tonda Tetsuji
Department Of Environmentrics And Biometrics Research Institute For Radiation Biology And Medicine H
-
Tonda Tetsuji
Department Of Environmetrics And Biometrics Research Institute For Radiation Biology And Medicine Hi
-
Tonda Tetsuji
Department Of Environmetrics And Biometrics Research Institute For S Adiation Biology And Medicine H
-
Tonda Tetsuji
Department Of Mathematics Graduate School Of Science Hiroshima University Higashi-hiroshima739-8526
-
Wakaki Hirofumi
Department of Mathematics, Graduate school of Science, Hiroshima University, Higashi-Hiroshima 739-8
-
Yanagihara Hirokazu
Institute of Policy and Planning Sciencs, University of Tsukuba
-
Matsumoto Chieko
Department ofMathematics, GraduateSchool of Science, Hiroshima University
-
Wakaki Hirofumi
Department Of Mathematics Graduate School Of Science Hiroshima University Higashi-hiroshima 739-8526
-
Wakaki Hirofumi
Department Of Mathematical Sciences Faculty Of Science Ehime University
-
YANAGIHARA Hirokazu
Department of Mathematics, Graduate School of Science, Hiroshima University
-
Yanagihara Hirokazu
Department Of Electrical Engineering Faculty Of Engineering Kanazawa Institute Of Technology
-
Yanagihara Hirokazu
Institute Of Policy And Planning Sciencs University Of Tsukuba
-
Yanagihara Hirokazu
Department Of Statistical Methodology The Institute Of Statistical Mathematics Tokyo 106-8569 Japan
-
Matsumoto Chieko
Department Of Mathematics Graduate School Of Science Hiroshima University
-
Matsumoto Chieko
Department Ofmathematics Graduateschool Of Science Hiroshima University
著作論文
- Asymptotic expansion of the null distribution of the likelihood ratio statistic for testing the equality of variances in a nonnormal one-way ANOVA model
- Asymptotic expansion of the null distribution of the modified normal likelihoodratio criterion for testing $\Sigma=\Sigma_0$ under nonnormality
- A class of multivariate discrete distributions based on an approximate density in GLMM
- Adjustment on an asymptotic expansion of the distribution function with $χ^2$-approximation