On the number of transversals in Cayley tables of cyclic groups
It is well known that if n is even, the addition table for the integers modulo n (which we denote by Bn) possesses no transversals. We show that if n is odd, then the number of transversals in Bn is at least exponential in n. Equivalently, for odd n, the
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|Source:||Discrete Applied Mathematics|
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