Kernkonzepte
Given a temporal graph, determining the maximum number of vertices that can be reached from any source vertex under a limited number of perturbations to the edge timestamps.
Zusammenfassung
The content discusses the problem of determining the maximum reachability in a temporal graph when the edge timestamps are subject to a limited number of perturbations.
Key highlights:
- Temporal graphs model time-sensitive networks and reachability is an important measure, but real-world temporal graphs may have incorrect edge timings.
- The authors introduce the concept of (δ, ζ)-perturbations, where up to ζ time-edges can be changed by at most ±δ.
- They show that the problem of determining if there exists a (δ, ζ)-perturbation that allows a source vertex to reach at least h vertices is NP-complete and W[2]-hard parameterized by ζ.
- However, they provide an algorithm that solves this problem in time O(n^2ζ+3 log(τ(G, λ))), where τ(G, λ) is the maximum number of time labels assigned to any edge.
- They also show that if the number of perturbations ζ is sufficiently large, the problem becomes tractable.
- Additionally, they investigate the complexity of related problems involving temporal eccentricity under perturbations.
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Zitate
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