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References
H. Hanani, On the Number of Orthogonal Latin Squares, J. Comb. Theory 8 (1970), 247–271.
D.R. Hughes and F.C. Piper, Projective Planes, Springer Verlag, New York 1973.
R.C. Bose and S.S. Shrikhande, On the Construction of Sets of Mutually Orthogonal Latin Squares and the Falsity of a Conjecture of Euler, Trans. Am. Math. Soc. 95 (1960), 191–209.
R.C. Bose, S.S. Shrikhande and E.T. Parker, Further Results on the Construction of Mutually Orthogonal Latin Squares and the Falsity of Euler's Conjecture, Can. J. of Math. 12 (1960), 189–203.
A. Hedayat, A Set of Three Mutually Orthogonal Latin Squares of Order 15, Technometrics 13 (1971), 696–698.
C.-C. Shih, A Method of Constructing Orthogonal Latin Squares (Chinese), Shuxhue Jinzhan 8 (1965), 98–104.
R.M. Wilson, Concerning the Number of Mutually Orthogonal Latin Squares, Discrete Mathematics (submitted).
G. Tarry, Le Problème des 36 Officiers, C.R. Assoc. Fr. Av. Sci. 1 (1900), 122–123 (1901), 170–203.
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van Lint, J.H. (1974). XIII. Orthogonal latin squares. In: Combinatorial Theory Seminar Eindhoven University of Technology. Lecture Notes in Mathematics, vol 382. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0057332
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DOI: https://doi.org/10.1007/BFb0057332
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