On the minimum number of entries in a pair of maximal orthogonal partial Latin squares
Abstract
It is shown that if F denotes the number of filled cells in a superimposed pair of maximal orthogonal partial Latin squares of order n, then F n2/3. This resolves a conjecture raised in an earlier paper by the current authors. It is also shown that, for n 21, the least possible number of filled cells in a pair of maximal orthogonal partial Latin squares is n2/3 , and that the structure that achieves this bound is unique up to permutations of rows, columns and entries.
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