1. Limits of Latin squares
- Author
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Garbe, Frederik, Hancock, Robert, Hladký, Jan, and Sharifzadeh, Maryam
- Subjects
Mathematics - Combinatorics ,05B15 - Abstract
We develop a limit theory of Latin squares, paralleling the recent limit theories of dense graphs and permutations. We introduce a notion of density, an appropriate version of the cut distance, and a space of limit objects - so-called Latinons. Key results of our theory are the compactness of the limit space and the equivalence of the topologies induced by the cut distance and the left-convergence. Last, using Keevash's recent results on combinatorial designs, we prove that each Latinon can be approximated by a finite Latin square., Comment: 66 pages, 1 figure, final version published in Discrete Analysis
- Published
- 2020
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