Random walks generated by the Ewens distribution on the symmetric group

Abstract

This paper studies Markov chains on the symmetric group Sn where the transition probabilities are given by the Ewens distribution with parameter θ>1. The eigenvalues are identified to be proportional to the content polynomials of partitions. We show that the mixing time is bounded above by a constant depending only on the parameter if θ is fixed. However, if it agrees with the number of permuted elements (θ=n), the sequence of chains has a total variation cutoff at n 2.