Latin squares and their defining sets
Abstract
A Latin square L(n,k) is a square of order n with its entries colored with k colors so that all the entries in a row or column have different colors. Let d(L(n,k)) be the minimal number of colored entries of an n × n square such that there is a unique way of coloring of the yet uncolored entries in order to obtain a Latin square L(n, k). In this paper we discuss the properties of d(L(n,k)) for k=2n-1 and k=2n-2. We give an alternate proof of the identity d(L(n, 2n-1))=n2-n, which holds for even n, and we establish the new result d(L(n, 2n-2)) ≥ n2-8n5 and show that this bound is tight for n divisible by 10.
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