Random sorting networks: edge limit
Abstract
A sorting network is a shortest path from 12… n to n… 21 in the Cayley graph of the symmetric group Sn spanned by adjacent transpositions. The paper computes the edge local limit of the uniformly random sorting networks as n∞. We find the asymptotic distribution of the first occurrence of a given swap (k,k+1) and identify it with the law of the smallest positive eigenvalue of a 2k× 2k aGUE (an aGUE matrix has purely imaginary Gaussian entries that are independently distributed subject to skew-symmetry). Next, we give two different formal definitions of a spacing -- the time distance between the occurrence of a given swap (k,k+1) in a uniformly random sorting network. Two definitions lead to two different expressions for the asymptotic laws expressed in terms of derivatives of Fredholm determinants.
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