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Mathematical expression of an inequality for a block design

  • Sanpei Kageyama
Article

Keywords

Block Design Incidence Matrix Equality Sign Zero Matrix Spectral Expansion 

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References

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    Bose, R. C. (1950).Least Squares Aspects of Analysis of Variance, Institute of Statistics, University of North Carolina.Google Scholar
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    Kageyama, S. (1979). Relation between experimental designs and matrix theory: Applications,Bull. Faculty of School Education, Hiroshima University, Part II,2, to appear.Google Scholar
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    Kageyama, S. and Tsuji, T. (1977). Characterization of certain incomplete block designs,J. Statist. Planning Inf.,1, 151–161.MathSciNetCrossRefGoogle Scholar
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    Kageyama, S. and Tsuji, T. (1979). Inequality for equireplicatedn-ary block designs with unequal sizes,J. Statist. Planning Inf., to appear.Google Scholar
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    Kageyama, S. and Tsuji, T. (1978). A condition for the validity of Fisher's inequality, submitted for publication.Google Scholar
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    Yamamoto, S. and Fujikoshi, Y. (1968). Two-way classification designs with unequal cell frequencies,J. Sci. Hiroshima Univ., Ser. A-I,32, 357–370.MathSciNetzbMATHGoogle Scholar

Copyright information

© The Institute of Statistical Mathematics, Tokyo 1979

Authors and Affiliations

  • Sanpei Kageyama
    • 1
  1. 1.Hiroshima UniversityHiroshimaJapan

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