The Sk shuffle block dynamics
Abstract
We introduce and analyze the Sk shuffle on N cards, a natural generalization of the celebrated random adjacent transposition shuffle. In the Sk shuffle, we choose uniformly at random a block of k consecutive cards, and shuffle these cards according to a permutation chosen uniformly at random from the symmetric group on k elements. We study the total-variation mixing time of the Sk shuffle when the number of cards N goes to infinity, allowing also k=k(N) to grow with N. In particular, we show that the cutoff phenomenon occurs when k=o(N16).
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