Blocking unions of arborescences

TL;DR

This paper investigates the problem of finding the minimum set of arcs to remove from a directed graph to destroy all minimum-cost k-union-arborescences, providing polynomial algorithms for specific uniform cases.

Contribution

It extends previous work by solving the uniform-cost and uniform-weight cases for the blocking problem of k-union-arborescences with polynomial algorithms.

Findings

Polynomial algorithm for uniform costs and weights case.

Polynomial algorithm for uniform costs with non-uniform weights when k is fixed.

Utilizes Helly-property of insolid sets to represent hypergraphs efficiently.

Abstract

Given a digraph $D=(V,A)$ and a positive integer $k$, a subset $B\subseteq A$ is called a \textbf{$k$-union-arborescence}, if it is the disjoint union of $k$ spanning arborescences. When also arc-costs $c:A\to \mathbb{R}$ are given, minimizing the cost of a $k$-union-arborescence is well-known to be tractable. In this paper we take on the following problem: what is the minimum cardinality of a set of arcs the removal of which destroys every minimum $c$-cost $k$-union-arborescence. Actually, the more general weighted problem is also considered, that is, arc weights $w:A\to \mathbb{R}_+$ (unrelated to $c$) are also given, and the goal is to find a minimum weight set of arcs the removal of which destroys every minimum $c$-cost $k$-union-arborescence. An equivalent version of this problem is where the roots of the arborescences are fixed in advance. In an earlier paper [A. Bern\'ath and Gy. Pap, \emph{Blocking optimal arborescences}, Integer Programming and Combinatorial Optimization, Springer, 2013] we solved this problem for $k=1$. This work reports on other partial results on the problem. We solve the case when both $c$ and $w$ are uniform -- that is, find a minimum size set of arcs that covers all $k$-union-arbosercences. Our algorithm runs in polynomial time for this problem. The solution uses a result of [M. B\'ar\'asz, J. Becker, and A. Frank, \emph{An algorithm for source location in directed graphs}, Oper. Res. Lett. \textbf{33} (2005)] saying that the family of so-called insolid sets (sets with the property that every proper subset has a larger in-degree) satisfies the Helly-property, and thus can be (efficiently) represented as a subtree hypergraph. We also give an algorithm for the case when only $c$ is uniform but $w$ is not. This algorithm is only polynomial if $k$ is not part of the input.