On a Class of Arrangements

C. Radhakrishna Rao

doi:10.1017/S0013091500002650

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

In this paper, I introduce a class of arrangements called arrays of strength d and discuss methods of constructing them with the help of finite geometrical configurations and algebraic groups involving elements of a Galois field. The definitions of arrays of strength d and other configurations that are used are given below.

References

REFERENCES

Bhattacharya, A., “A note on Ramamurti's problem of maximal sets,” Sankhya, 6 (1942), 189.Google Scholar

Fisher, R. A. and Yates, F., “The 6 × 6 Latin squares,” Proc. Camb. Phil. Soc., 146 (1934), 1.Google Scholar

Plackett, R. L. and Burman, J. P., “The design of optimum multifactorial experiments,” Biometrika, 33 (1946), 305.CrossRef Google Scholar

Rao, C. R., “On hypercubes of strength d and a system of confounding in factorial experiments,” Bull. Calcutta Math. Soc., 38 (1946), 1.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Bhat, Vasanti N. 1969. On inequivalent balanced incomplete block designs, I. Journal of Combinatorial Theory, Vol. 6, Issue. 4, p. 412.

RAO, C. RADHAKRISHNA 1973. A Survey of Combinatorial Theory. p. 349.

Hedayat, A.S. and Stufken, J. 1989. Statistical Data Analysis and Inference. p. 33.

Dodge, Yadolah 1989. Statistical Data Analysis and Inference. p. 3.

Brualdi, R.A. and Csima, J. 1991. Small matrices of large dimension. Linear Algebra and its Applications, Vol. 150, Issue. , p. 227.

Diestelkamp, Wiebke S. 2000. The decomposability of simple orthogonal arrays on 3 symbols havingt + 1 rows and strengtht. Journal of Combinatorial Designs, Vol. 8, Issue. 6, p. 442.

DeCock, Dean and Stufken, John 2000. On finding mixed orthogonal arrays of strength 2 with many 2-level factors. Statistics & Probability Letters, Vol. 50, Issue. 4, p. 383.

Gupta, Sat 2007. Life and Work of C. R. Rao. Journal of Statistical Theory and Practice, Vol. 1, Issue. 1, p. 141.

Rao, C. R. 2007. Life and Work of Ronald Aylmer Fisher. Journal of Statistical Theory and Practice, Vol. 1, Issue. 3-4, p. 489.

Li, Dongguang 2008. Gene Expression Studies with DGL Global Optimization for the Molecular Classification of Colon Cancer. p. 284.

Rao, C. R. 2008. Life and Work of Ronald Aylmer Fisher. Journal of Statistical Theory and Practice, Vol. 2, Issue. 1, p. 131.

Koukouvinos, C. Lappas, B. and Simos, D. E. 2009. Encryption schemes using orthogonal arrays. Journal of Discrete Mathematical Sciences and Cryptography, Vol. 12, Issue. 5, p. 615.

Li, Dongguang 2011. Gene expression studies with DGL global optimization for the molecular classification of cancer. Soft Computing, Vol. 15, Issue. 1, p. 111.

Koukouvinos, Christos and Simos, Dimitris E. 2012. Applications of Mathematics and Informatics in Military Science. Vol. 71, Issue. , p. 189.

Dey, Aloke and Mukerjee, Rahul 2012. Development of Research in Experimental Design in India. International Statistical Review, Vol. 80, Issue. 2, p. 231.

Bush, Stephen 2014. Optimal Designs for Stated Choice Experiments Generated From Fractional Factorial Designs. Journal of Statistical Theory and Practice, Vol. 8, Issue. 2, p. 367.

Goyeneche, Dardo and Życzkowski, Karol 2014. Genuinely multipartite entangled states and orthogonal arrays. Physical Review A, Vol. 90, Issue. 2,

2015. Latin Squares and their Applications. p. 361.

Hedayat, A. S. 2017. Mathematics Across Contemporary Sciences. Vol. 190, Issue. , p. 111.

Bailey, R. A. 2017. Surveys in Combinatorics 2017. p. 1.

Download full list

Article contents

On a Class of Arrangements

Extract

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests