Some comments on Latin squares and on Graeco-Latin squares, illustrated with postage stamps and old playing cards
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DOI: 10.1007/s00362-009-0261-5
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References listed on IDEAS
- Peter Ullrich, 2002. "Officers, playing cards, and sheep," Metrika: International Journal for Theoretical and Applied Statistics, Springer, vol. 56(3), pages 189-204, December.
- R. A. Bailey & H. Monod, 2001. "Efficient Semi‐Latin Rectangles: Designs for Plant Disease Experiments," Scandinavian Journal of Statistics, Danish Society for Theoretical Statistics;Finnish Statistical Society;Norwegian Statistical Association;Swedish Statistical Association, vol. 28(2), pages 257-270, June.
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Keywords
Bachet’s square; Bibliography; Bi-square; Raj Chandra Bose; József Dénes; Diagonal Latin squares of order 6; Leonhard Euler; Euler squares; Eulerian squares; Euler’s conjecture; Sir Ronald Aylmer Fisher; Graeco-Roman squares; History; Simon de La Loubère; Knut Vik design; Knight’s move design; Knight’s tour; Magic squares; MOLS; Mutually orthogonal Latin squares; Jacques Ozanam; Ozanam–Grandin solution to the Magic Card Puzzle; Edward Tilden Parker; Parker’s Graeco-Latin square of order 10; Georges Perec; Abbé François-Guillaume Poignard; Sharadchandra Shankar Shrikhande; Thirty-six officers problem; Topical philately; Weißwurst Äquator; 01A45; 01A50; 05A99; 05B15; 62K05; 62K10; 62K15;All these keywords.
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Statistics
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