English

Path eccentricity of graphs

Combinatorics 2022-02-08 v1 Discrete Mathematics

Abstract

Let GG be a connected graph. The eccentricity of a path PP, denoted by eccG(P)_G(P), is the maximum distance from PP to any vertex in GG. In the \textsc{Central path} (CP) problem our aim is to find a path of minimum eccentricity. This problem was introduced by Cockayne et al., in 1981, in the study of different centrality measures on graphs. They showed that CP can be solved in linear time in trees, but it is known to be NP-hard in many classes of graphs such as chordal bipartite graphs, planar 3-connected graphs, split graphs, etc. We investigate the path eccentricity of a connected graph~GG as a parameter. Let pe(G)(G) denote the value of eccG(P)_G(P) for a central path PP of GG. We obtain tight upper bounds for pe(G)(G) in some graph classes. We show that pe(G)1(G) \leq 1 on biconvex graphs and that pe(G)2(G) \leq 2 on bipartite convex graphs. Moreover, we design algorithms that find such a path in linear time. On the other hand, by investigating the longest paths of a graph, we obtain tight upper bounds for pe(G)(G) on general graphs and kk-connected graphs. Finally, we study the relation between a central path and a longest path in a graph. We show that on trees, and bipartite permutation graphs, a longest path is also a central path. Furthermore, for superclasses of these graphs, we exhibit counterexamples for this property.

Keywords

Cite

@article{arxiv.2202.02599,
  title  = {Path eccentricity of graphs},
  author = {Renzo Gómez and Juan Gutiérrez},
  journal= {arXiv preprint arXiv:2202.02599},
  year   = {2022}
}
R2 v1 2026-06-24T09:21:51.444Z