84 research outputs found
Blocking optimal -arborescences
Given a digraph and a positive integer , an arc set is called a \textbf{-arborescence} if it is the disjoint union of
spanning arborescences. The problem of finding a minimum cost -arborescence
is known to be polynomial-time solvable using matroid intersection. In this
paper we study the following problem: find a minimum cardinality subset of arcs
that contains at least one arc from every minimum cost -arborescence. For
, the problem was solved in [A. Bern\'ath, G. Pap , Blocking optimal
arborescences, IPCO 2013]. In this paper we give an algorithm for general
that has polynomial running time if is fixed
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