Degrees in random uniform minimal factorizations

Abstract

We are interested in random uniform minimal factorizations of the n-cycle which are factorizations of (1~2… n) into a product of n-1 transpositions. Our main result is an explicit formula for the joint probability that 1 and 2 appear a given number of times in a uniform minimal factorization. For this purpose, we combine bijections with Cayley trees together with explicit computations of multivariate generating functions.