Bonds intersecting long paths in $k$-connected graphs
Abstract
A well-known question of Gallai (1966) asked whether there is a vertex which passes through all longest paths of a connected graph. Although this has been verified for some special classes of graphs such as outerplanar graphs, circular arc graphs, and series-parallel graphs, the answer is negative for general graphs. In this paper, we prove among other results that if we replace the vertex by a bond, then the answer is affirmative. A bond of a graph is a minimal nonempty edge-cut. In particular, in any 2-connected graph, the set of all edges incident to a vertex is a bond, called a vertex-bond. Clearly, for a 2-connected graph, a path passes through a vertex if and only if it meets the vertex-bond with respect to . Therefore, a very natural approach to Gallai's question is to study whether there is a bond meeting all longest paths. Let denote the length of a longest path of connected graphs. We show that for any 2-connected graph, there is a bond meeting all paths of length at least . We then prove that for any 3-connected graph, there is a bond meeting all paths of length at least . For a -connected graph , we show that there is a bond meeting all paths of length at least , where if is even and if is odd. Our results provide analogs of the corresponding results of P. Wu and S. McGuinness [Bonds intersecting cycles in a graph, Combinatorica 25 (4) (2005), 439-450] also.
Cite
@article{arxiv.2201.11245,
title = {Bonds intersecting long paths in $k$-connected graphs},
author = {Bing Wei and Haidong Wu and Qinghong Zhao},
journal= {arXiv preprint arXiv:2201.11245},
year = {2022}
}
Comments
17 pages, 15 figures