Random generation under the Ewens distribution
Abstract
The Ewens sampling formula with parameter α is the distribution on Sn which gives each π∈ Sn weight proportional to αC(π), where C(π) is the number of cycles of π. We show that, for any fixed α, two Ewens-random permutations generate at least An with high probability. More generally we work out how many permutations are needed for α growing with n. Roughly speaking, two are needed for 0 ≤ α n1/2, three for n1/2 α n2/3, etc.
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