Perfect shuffling with fewer lazy transpositions

Abstract

A lazy transposition (a,b,p) is the random permutation that equals the identity with probability 1-p and the transposition (a,b)∈ Sn with probability p. How long must a sequence of independent lazy transpositions be if their composition is uniformly distributed? It is known that there are sequences of length n2, but are there shorter sequences? This was raised by Fitzsimons in 2011, and independently by Angel and Holroyd in 2018. We answer this question negatively by giving a construction of length 23 n2+O(n n), and consider some related questions.