Compositions of random transpositions

Abstract

Let Y=(y1,y2,...), y1 y2..., be the list of sizes of the cycles in the composition of c n transpositions on the set \1,2,...,n\. We prove that if c>1/2 is constant and n∞, the distribution of f(c)Y/n converges to PD(1), the Poisson-Dirichlet distribution with paramenter 1, where the function f is known explicitly. A new proof is presented of the theorem by Diaconis, Mayer-Wolf, Zeitouni and Zerner stating that the PD(1) measure is the unique invariant measure for the uniform coagulation-fragmentation process.

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