Cutoff for asymmetric shelf shuffle

Abstract

A mechanical shuffler consists of m shelves. A deck of n cards, arranged in increasing order, is dealt from the bottom sequentially. Each card is assigned a shelf uniformly at random and placed on the top (bottom) of the existing pile with probability p (1-p) independently. We refer to this as asymmetric shelf-shuffle. We find the law νn, m(p) of the permutation induced by the asymmetric shelf-shuffle and show that the pair consisting of the number of descents and the number of valleys is a sufficient statistic. This generalizes a result of Diaconis, Fulman, and Holmes (Ann. Appl. Prob., 2013) corresponding to the case p=1/2. For p=1/2, Chen and Ottolini (ECP, 2025) established the cutoff in the total variation distance near n5/4. We establish the cutoff for the asymmetric shelf shuffle. Let νn be the uniform measure on the set of all permutations Sn of \1, …, n\. For a fixed p≠ 1/2 and c>0, we show that \[(νn, cn3/2 (p), νn)=1-2Φ(-|2p-1|43c)+Oc, p(n-1/2)\;.\] We also establish the cutoff in the separation distance near m≈ n2 and in the relative entropy near m=n3/2. In both cases, we also obtain the cutoff profile explicitly.