English

Arc connectivity and submodular flows in digraphs

Combinatorics 2023-10-31 v1 Optimization and Control

Abstract

Let D=(V,A)D=(V,A) be a digraph. For an integer k1k\geq 1, a kk-arc-connected flip is an arc subset of DD such that after reversing the arcs in it the digraph becomes (strongly) kk-arc-connected. The first main result of this paper introduces a sufficient condition for the existence of a kk-arc-connected flip that is also a submodular flow for a crossing submodular function. More specifically, given some integer τ1\tau\geq 1, suppose dA+(U)+(τk1)dA(U)τd_A^+(U)+(\frac{\tau}{k}-1)d_A^-(U)\geq \tau for all UV,UU\subsetneq V, U\neq \emptyset, where dA+(U)d_A^+(U) and dA(U)d_A^-(U) denote the number of arcs in AA leaving and entering UU, respectively. Let C\mathcal{C} be a crossing family over ground set VV, and let f:CZf:\mathcal{C}\to \mathbb{Z} be a crossing submodular function such that f(U)kτ(dA+(U)dA(U))f(U)\geq \frac{k}{\tau}(d_A^+(U)-d_A^-(U)) for all UCU\in \mathcal{C}. Then DD has a kk-arc-connected flip JJ such that f(U)dJ+(U)dJ(U)f(U)\geq d_J^+(U)-d_J^-(U) for all UCU\in \mathcal{C}. The result has several applications to Graph Orientations and Combinatorial Optimization. In particular, it strengthens Nash-Williams' so-called weak orientation theorem, and proves a weaker variant of Woodall's conjecture on digraphs whose underlying undirected graph is τ\tau-edge-connected. The second main result of this paper is even more general. It introduces a sufficient condition for the existence of capacitated integral solutions to the intersection of two submodular flow systems. This sufficient condition implies the classic result of Edmonds and Giles on the box-total dual integrality of a submodular flow system. It also has the consequence that in a weakly connected digraph, the intersection of two submodular flow systems is totally dual integral.

Keywords

Cite

@article{arxiv.2310.19472,
  title  = {Arc connectivity and submodular flows in digraphs},
  author = {Ahmad Abdi and Gérard Cornuéjols and Giacomo Zambelli},
  journal= {arXiv preprint arXiv:2310.19472},
  year   = {2023}
}

Comments

29 pages, 4 figures

R2 v1 2026-06-28T13:05:48.134Z