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Autori principali: Casteigts, Arnaud, Morawietz, Nils, Wolf, Petra
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2406.19514
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author Casteigts, Arnaud
Morawietz, Nils
Wolf, Petra
author_facet Casteigts, Arnaud
Morawietz, Nils
Wolf, Petra
contents A temporal graph is a graph whose edges only appear at certain points in time. Reachability in these graphs is defined in terms of paths that traverse the edges in chronological order (temporal paths). This form of reachability is neither symmetric nor transitive, the latter having important consequences on the computational complexity of even basic questions, such as computing temporal connected components. In this paper, we introduce several parameters that capture how far a temporal graph $\mathcal{G}$ is from being transitive, namely, \emph{vertex-deletion distance to transitivity} and \emph{arc-modification distance to transitivity}, both being applied to the reachability graph of $\mathcal{G}$. We illustrate the impact of these parameters on the temporal connected component problem, obtaining several tractability results in terms of fixed-parameter tractability and polynomial kernels. Significantly, these results are obtained without restrictions of the underlying graph, the snapshots, or the lifetime of the input graph. As such, our results isolate the impact of non-transitivity and confirm the key role that it plays in the hardness of temporal graph problems.
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id arxiv_https___arxiv_org_abs_2406_19514
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Distance to Transitivity: New Parameters for Taming Reachability in Temporal Graphs
Casteigts, Arnaud
Morawietz, Nils
Wolf, Petra
Computational Complexity
A temporal graph is a graph whose edges only appear at certain points in time. Reachability in these graphs is defined in terms of paths that traverse the edges in chronological order (temporal paths). This form of reachability is neither symmetric nor transitive, the latter having important consequences on the computational complexity of even basic questions, such as computing temporal connected components. In this paper, we introduce several parameters that capture how far a temporal graph $\mathcal{G}$ is from being transitive, namely, \emph{vertex-deletion distance to transitivity} and \emph{arc-modification distance to transitivity}, both being applied to the reachability graph of $\mathcal{G}$. We illustrate the impact of these parameters on the temporal connected component problem, obtaining several tractability results in terms of fixed-parameter tractability and polynomial kernels. Significantly, these results are obtained without restrictions of the underlying graph, the snapshots, or the lifetime of the input graph. As such, our results isolate the impact of non-transitivity and confirm the key role that it plays in the hardness of temporal graph problems.
title Distance to Transitivity: New Parameters for Taming Reachability in Temporal Graphs
topic Computational Complexity
url https://arxiv.org/abs/2406.19514