Commutators of n-cycles in the symmetric group
Abstract
We show that for n 6 every even permutation on n symbols is the commutator of two n-cycles. More precisely, let Sn be the symmetric group and An the alternating group. Let C(n) ⊂ Sn denote the conjugacy class of n-cycles and [·, ·] be the commutator of two permutations. We prove: The map C(n) × C(n) An, \ (τ, π) [τ, π] is surjective for all n 6.
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