Mixing Time of the Overlapping Cycles Shuffle

Abstract

In each step of the overlapping cycles shuffle on n cards, a fair coin is flipped which determines whether the mth card or the nth card is moved to the top of the deck. Angel, Peres, and Wilson showed the following interesting fact: If m = α n where α is rational, then the relaxation time of a single card in the overlapping cycles shuffle is θ(n2). However if α is the golden ratio, then the relaxation time of a single card is θ(n32). We show that the mixing time of the entire deck under the overlapping cycles shuffle matches these bounds up to a factor of (n)3. That is, the mixing time of the entire deck is O(n2 (n)3) if α is rational and O(n32 (n)3) if α is the golden ratio.

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