A Note on the Complexity of Maximizing Temporal Reachability via Edge Temporalisation of Directed Graphs

April 03, 2023 Β· Declared Dead Β· πŸ› Social Science Research Network

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Authors Alkida Balliu, Filippo Brunelli, Pierluigi Crescenzi, Dennis Olivetti, Laurent Viennot arXiv ID 2304.00817 Category cs.DS: Data Structures & Algorithms Cross-listed math.CO Citations 1 Venue Social Science Research Network Last Checked 4 months ago
Abstract
A temporal graph is a graph in which edges are assigned a time label. Two nodes u and v of a temporal graph are connected one to the other if there exists a path from u to v with increasing edge time labels. We consider the problem of assigning time labels to the edges of a digraph in order to maximize the total reachability of the resulting temporal graph (that is, the number of pairs of nodes which are connected one to the other). In particular, we prove that this problem is NP-hard. We then conjecture that the problem is approximable within a constant approximation ratio. This conjecture is a consequence of the following graph theoretic conjecture: any strongly connected directed graph with n nodes admits an out-arborescence and an in-arborescence that are edge-disjoint, have the same root, and each spans $Ξ©$(n) nodes.
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