The Limit of the Empirical Measure of the Product of Two Independent Mallows Permutations
Abstract
The Mallows measure is a probability measure on Sn where the probability of a permutation π is proportional to ql(π) with q > 0 being a parameter and l(π) the number of inversions in π. We show the convergence of the random empirical measure of the product of two independent permutations drawn from the Mallows measure, when q is a function of n and n(1-q) has limit in R as n ∞.
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