arXiv:2212.06109 Abstract | arXiv Analytics

arXiv:2212.06109 [math.CO]Abstract References Reviews Resources

Optimal thresholds for Latin squares, Steiner Triple Systems, and edge colorings

Published 2022-12-12Version 1

We show that the threshold for the binomial random $3$-partite, $3$-uniform hypergraph $G^{3}((n,n,n),p)$ to contain a Latin square is $\Theta(\log{n}/n)$. We also prove analogous results for Steiner triple systems and proper list edge-colorings of the complete (bipartite) graph with random lists. Our results answer several related questions of Johansson, Luria-Simkin, Casselgren-H\"aggkvist, Simkin, and Kang-Kelly-K\"uhn-Methuku-Osthus.

Comments: 12 pages

Categories: math.CO, cs.DM, math.PR

Keywords: steiner triple systems, latin square, edge colorings, optimal thresholds, proper list edge-colorings

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