English

Short reachability networks

Combinatorics 2025-11-05 v3

Abstract

We investigate the following generalisation of permutation networks. We say a sequence T=(T1,,T)T=(T_1,\dots,T_\ell) of transpositions in SnS_n forms a tt-reachability network if, for every choice of tt distinct points x1,,xt{1,,n}x_1, \dots, x_t\in \{1,\dots,n\}, there is a subsequence of TT whose composition maps jj to xjx_j for every 1jt1\leq j\leq t. When t=nt=n, any permutation in SnS_n can be created and TT is a permutation network. Waksman [JACM, 1968] showed that the shortest permutation networks have length about nlog2(n)n \log_2(n). In this paper, we investigate the shortest tt-reachability networks for other values of tt. Our main result settles the case of t=2t=2: the shortest 22-reachability network has length 3n/22\lceil 3n/2\rceil-2 . For fixed t3t \geq 3, we give a simple randomised construction which shows that there exist tt-reachability networks with (2+ot(1))n(2+o_t(1))n transpositions. We also study the effect of restricting to star-transpositions, i.e. restricting all transpositions to have the form (1,)(1, \cdot).

Keywords

Cite

@article{arxiv.2208.06630,
  title  = {Short reachability networks},
  author = {Carla Groenland and Tom Johnston and Jamie Radcliffe and Alex Scott},
  journal= {arXiv preprint arXiv:2208.06630},
  year   = {2025}
}

Comments

12 pages, 1 figure

R2 v1 2026-06-25T01:41:04.277Z