Limit theorems for random permutations induced by Chinese restaurant processes

Abstract

We investigate the random permutation matrices induced by the Chinese restaurant processes with (α,θ)-seating. When α=0,θ>0, the permutations are those following Ewens measures on symmetric groups, and have been extensively studied in the literature. Here, we consider α∈(0,1) and θ>-α. In an accompanying paper, a functional central limit theorem is established for partial sum of weighted cycle counts in the form of Σj=1n ajCn,j, where Cn,j is the number of j-cycles of the permutation matrix of size n. Two applications are presented. One is on linear statistics of the spectrum, and the other is on the characteristic polynomials outside the unit circle.

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