The hit-and-run version of top-to-random

Abstract

We study an example of a hit-and-run random walk on the symmetric group Sn. Our starting point is the well understood top-to-random shuffle. In the hit-and-run version, at each single step, after picking the point of insertion, j, uniformly at random in \1,…,n\, the top card is inserted in the j-th position k times in a row where k is uniform in \0,1,…,j-1\. The question is, does this accelerate mixing significantly or not? We show that, in L2 and sup-norm, this accelerates mixing at most by a constant factor (independent of n). Analyzing this problem in total variation is an interesting open question.