Latin squares with non-partitioning disjoint subsquares
Abstract
A latin square of order n with pairwise disjoint subsquares of orders h1,…,hk such that h1+…+hk = n is known as a realization. The existence of realizations is a partially solved problem with a few general results for an arbitrary number of subsquares, k. Requiring only that h1+…+hk≤ n gives a variation of the problem that has few known results. In this paper we prove a general necessary condition for existence and completely determine existence when there are at most three subsquares or the subsquares are all of the same order. Importantly, we prove that if h1≥ h2≥…≥ hk and n≥ h1+Σi=1khi then such a latin square always exists.
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