The random k cycle walk on the symmetric group
Abstract
We study the random walk on the symmetric group Sn generated by the conjugacy class of cycles of length k. We show that the convergence to uniform measure of this walk has a cut-off in total variation distance after nk log n steps, uniformly in k = o(n) as n ∞. The analysis follows from a new asymptotic estimation of the characters of the symmetric group evaluated at cycles.
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