Non-empty intersection of longest paths in P5-free and claw-free graphs
Abstract
A family F of graphs is a Gallai family if for every connected graph G∈ F, all longest paths in G have a common vertex. While it is not known whether P5-free graphs are a Gallai family, Long Jr., Milans, and Munaro [The Electronic Journal of Combinatorics, 2023] showed that this is not the case for the class of claw-free graphs. We give a complete characterization of the graphs H of size at most five for which (claw, H)-free graphs form a Gallai family. We also show that (P5, H)-free graphs form a Gallai family if H is a triangle, a paw, or a diamond. Both of our results are constructive.
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