A central limit theorem for cycles of Mallows permutations
Abstract
Fix q≠ 1, and sample w∈ Sn from the Mallows measure. We study the distribution of Ci(w), the number of i-cycles, as n grows large. When q<1, they are jointly Gaussian, and this more or less follows from known ideas, but the regime q>1 behaves quite differently. In particular, we show that the even cycles C2i(w) have a mean and variance of order n, and jointly converge to Gaussian random variables, while the odd cycles C2i+1(w) have a bounded mean and variance, and converge to C2i+1(weven) or C2i+1(wodd) for some explicit random permutations weven and wodd, depending on whether n is even or odd. An extension to a larger class of functions is also given. The proof utilizes a two-sided stationary regenerative process associated to Mallows permutations constructed by Gnedin and Olshanski, extending the ideas of Basu and Bhatnagar.
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