Transversals in quasirandom latin squares
Abstract
A transversal in an n × n latin square is a collection of n entries not repeating any row, column, or symbol. Kwan showed that almost every n × n latin square has ((1 + o(1)) n / e2)n transversals as n ∞. Using a loose variant of the circle method we sharpen this to (e-1/2 + o(1)) n!2 / nn. Our method works for all latin squares satisfying a certain quasirandomness condition, which includes both random latin squares with high probability as well as multiplication tables of quasirandom groups.
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