Subsquares in random Latin squares and rectangles
Abstract
A k × n partial Latin rectangle is C-sparse if the number of nonempty entries in each row and column is at most C and each symbol is used at most C times. We prove that the probability a uniformly random k × n Latin rectangle, where k < (1/2 - α)n, contains a β n-sparse partial Latin rectangle with nonempty entries is (1 n) for sufficiently large n and sufficiently small β. Using this result, we prove that a uniformly random order-n Latin square asymptotically almost surely has no Latin subsquare of order greater than cn n for an absolute constant c.
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