Explicit cutoff profiles for colored top-m-to-random shuffles

Abstract

We study p-colored top-m-to-random on the wreath product Gn,p=Cp Sn, with m fixed. Using the Nakano-Sadahiro-Sakurai basis elements Bm, we obtain exact nested-set occupancy mixtures and reduce the likelihood ratio to the single statistic Lp. This yields exact formulas for separation and L∞(U), and exact one-dimensional formulas for total variation, Lq(U) (1 q<∞), χ2, and relative entropy. At k= nm( n+c), the number of never-chosen labels in the associated m-subset occupancy model converges in law to Poisson(e-c), giving the total-variation profile fp(c), the separation profile, and the corresponding Lq(U), L∞(U), χ2, and relative-entropy profiles. For m=1 we recover colored top-to-random; for p=1, the total-variation profile reduces to the Diaconis-Fill-Pitman profile. For the reversed chain, we also identify optimal strong stationary times whose tail probabilities are exactly the separation distances.