The Archimedean limit of random sorting networks

Abstract

A sorting network (also known as a reduced decomposition of the reverse permutation), is a shortest path from 12 ·s n to n ·s 21 in the Cayley graph of the symmetric group Sn generated by adjacent transpositions. We prove that in a uniform random n-element sorting network σn, all particle trajectories are close to sine curves with high probability. We also find the weak limit of the time-t permutation matrix measures of σn. As a corollary of these results, we show that if Sn is embedded into Rn via the map τ (τ(1), τ(2), … τ(n)), then with high probability, the path σn is close to a great circle on a particular (n-2)-dimensional sphere in Rn. These results prove conjectures of Angel, Holroyd, Romik, and Virag.