Partial mixing of semi-random transposition shuffles

Abstract

We show that for any semi-random transposition shuffle on n cards, the mixing time of any given k cards is at most n k, provided k=o((n/ n)1/2). In the case of the top-to-random transposition shuffle we show that there is cutoff at this time with a window of size O(n), provided further that k∞ as n∞ (and no cutoff otherwise). For the random-to-random transposition shuffle we show cutoff at time (1/2)n k for the same conditions on k. Finally, we analyse the cyclic-to-random transposition shuffle and show partial mixing occurs at time α n k for some α just larger than 1/2. We prove these results by relating the mixing time of k cards to the mixing of one card. Our results rely heavily on coupling arguments to bound the total variation distance.