Mixing times for random k-cycles and coalescence-fragmentation chains
Abstract
Let Sn be the permutation group on n elements, and consider a random walk on Sn whose step distribution is uniform on k-cycles. We prove a well-known conjecture that the mixing time of this process is (1/k)n n, with threshold of width linear in n. Our proofs are elementary and purely probabilistic, and do not appeal to the representation theory of Sn.
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