English

Increasing arc-connectivity by bounded- and fixed-size inversions

Combinatorics 2026-04-27 v1 Discrete Mathematics

Abstract

For a digraph DD and some XV(D)X \subseteq V(D), the inversion of XX is the operation of flipping all arcs both of whose endvertices are in XX. We initiate the study of establishing arc-connectivity properties by applying inversions of bounded or fixed size. For fixed-size inversions, the feasibility problem is interesting. For all integers p2p \geq 2 and k1k \geq 1, we give a characterization of the digraphs that can be made kk-arc-strong by applying inversions of size exactly pp, provided they are sufficiently large. For bounded-size inversions, the feasibility problem is easy, so we focus on minimising the number of inversions. We prove that for all integers p3p\geq 3 and k1k \geq 1 and any ϵ>0\epsilon>0, there exists a polynomial-time (4k2+ϵ)(4k-2+\epsilon)-approximation algorithm for computing the minimum number of inversions of size at most pp that make a given digraph kk-arc-strong. This is in stark contrast to other results on inversion optimization problems. On the other hand, we show that for any p3p\geq 3 and k1k \geq 1 the problem is NP-hard, and, moreover, APX-hard. As a result on parameterized complexity, we show that for any k2k \geq 2, it is W[1]W[1]-hard with respect to pp to decide whether a given digraph can be made kk-arc-strong by applying a single inversion of size at most pp. We also prove that for a given multidigraph, it is W[1]W[1]-hard with respect to \ell to decide whether it can be made 2-arc-strong by applying \ell inversions of size 2.

Keywords

Cite

@article{arxiv.2604.22584,
  title  = {Increasing arc-connectivity by bounded- and fixed-size inversions},
  author = {Florian Hörsch and Lucas Picasarri-Arrieta},
  journal= {arXiv preprint arXiv:2604.22584},
  year   = {2026}
}
R2 v1 2026-07-01T12:33:53.468Z