A pattern theorem for random sorting networks

Author(s)

Angel, Omer; Gorin, Vadim; Holroyd, Alexander E

Abstract

A sorting network is a shortest path from 12⋯n to n⋯21 in the Cayley graph of the symmetric group S[subscript n] generated by nearest-neighbor swaps. A pattern is a sequence of swaps that forms an initial segment of some sorting network. We prove that in a uniformly random n-element sorting network, any fixed pattern occurs in at least cn[superscript 2] disjoint space-time locations, with probability tending to 1 exponentially fast as n→∞. Here c is a positive constant which depends on the choice of pattern. As a consequence, the probability that the uniformly random sorting network is geometrically realizable tends to 0.

Date issued

2012-11

URI

http://hdl.handle.net/1721.1/89523

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Electronic Journal of Probability

Publisher

Institute of Mathematical Statistics

Citation

Angel, Omer, Vadim Gorin, and Alexander E Holroyd. “A Pattern Theorem for Random Sorting Networks.” Electronic Journal of Probability 17, no. 0 (January 1, 2012).

Version: Final published version

ISSN

1083-6489