Nonempty Intersection of Longest Paths in Series-Parallel Graphs
Abstract
In 1966 Gallai asked whether all longest paths in a connected graph have nonempty intersection. This is not true in general and various counterexamples have been found. However, the answer to Gallai's question is positive for several well-known classes of graphs, as for instance connected outerplanar graphs, connected split graphs, and 2-trees. A graph is series-parallel if it does not contain as a minor. Series-parallel graphs are also known as partial 2-trees, which are arbitrary subgraphs of 2-trees. We present a proof that every connected series-parallel graph has a vertex that is common to all of its longest paths. Since 2-trees are maximal series-parallel graphs, and outerplanar graphs are also series-parallel, our result captures these two classes in one proof and strengthens them to a larger class of graphs. We also describe how this vertex can be found in linear time.
Keywords
Cite
@article{arxiv.1310.1376,
title = {Nonempty Intersection of Longest Paths in Series-Parallel Graphs},
author = {Julia Ehrenmüller and Cristina G. Fernandes and Carl Georg Heise},
journal= {arXiv preprint arXiv:1310.1376},
year = {2016}
}
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17 pages