The random (n-k)-cycle to transpositions walk on the symmetric group

Abstract

We study the rate of convergence of the Markov chain on Sn which starts with a random (n-k)-cycle for a fixed k ≥ 1, followed by random transpositions. The convergence to the stationary distribution turns out to be of order n. We show that after cn + k2n steps for c>0, the law of the Markov chain is close to the uniform distribution. The character of the defining representation is used as test function to obtain a lower bound for the total variation distance. We identify the asymptotic distribution of the test function given the law of the Markov chain for the (n-1)-cycle case. The upper bound relies on estimates for the difference of normalized characters.