English

A look at generalized perfect shuffles

Combinatorics 2022-03-09 v2 Group Theory

Abstract

Standard perfect shuffles involve splitting a deck of 2n2n cards into two stacks and interlacing the cards from the stacks. There are two ways that this interlacing can be done, commonly referred to as an in shuffle and an out shuffle, respectively. In 1983, Diaconis, Graham, and Kantor determined the permutation group generated by in and out shuffles on a deck of 2n2n cards for all nn. Diaconis et al. concluded their work by asking whether similar results can be found for so-called generalized perfect shuffles. For these new shuffles, we split a deck of mnmn cards into mm stacks and similarly interlace the cards with an in mm-shuffle or out mm-shuffle (denoted ImI_m and OmO_m, respectively). In this paper, we find the structure of the group generated by these two shuffles for a deck of mkm^k cards, together with mym^y-shuffles, for all possible values of mm, kk, and yy. The group structure is completely determined by k/gcd(y,k)k/\gcd(y,k) and the parity of y/gcd(y,k)y/\gcd(y,k). In particular, the group structure is independent of the value of mm.

Keywords

Cite

@article{arxiv.2009.09349,
  title  = {A look at generalized perfect shuffles},
  author = {Samuel Johnson and Lakshman Manny and Cornelia A. Van Cott and QiYu Zhang},
  journal= {arXiv preprint arXiv:2009.09349},
  year   = {2022}
}

Comments

13 pages, 5 figures. Shortened argument in proofs of the main results, results unchanged

R2 v1 2026-06-23T18:39:59.854Z