Almost every Latin square has a decomposition into transversals
Abstract
In 1782, Euler conjectured that no Latin square of order n 2\; mod\; 4 has a decomposition into transversals. While confirmed for n=6 by Tarry in 1900, Bose, Parker, and Shrikhande constructed counterexamples in 1960 for each n 2\; mod\; 4 with n≥ 10. We show that, in fact, counterexamples are extremely common, by showing that if a Latin square of order n is chosen uniformly at random then with high probability it has a decomposition into transversals.
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