A closure for Hamilton-connectedness in $\{K_{1,3},\Gamma_3\}$-free   graphs

Adam Kabela; Zden\v{e}k Ryj\'a\v{c}ek; M\'aria Skyvov\'a; Petr Vr\'ana

arXiv:2406.03036·math.CO·July 26, 2024

A closure for Hamilton-connectedness in $\{K_{1,3},\Gamma_3\}$-free graphs

Adam Kabela, Zden\v{e}k Ryj\'a\v{c}ek, M\'aria Skyvov\'a, Petr Vr\'ana

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TL;DR

This paper introduces a closure technique for a specific class of graphs that preserves Hamilton-connectedness, aiding in characterizing graphs with certain forbidden subgraphs that guarantee Hamilton-connectedness.

Contribution

It presents a novel closure method for $\

Findings

01

Closure transforms $\

02

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Abstract

We introduce a closure technique for Hamilton-connectedness of ${K_{1, 3}, Γ_{3}}$ -free graphs, where $Γ_{3}$ is the graph obtained by joining two vertex-disjoint triangles with a path of length $3$ . The closure turns a claw-free graph into a line graph of a multigraph while preserving its (non)-Hamilton-connectedness. The most technical parts of the proof are computer-assisted. The main application of the closure is given in a subsequent paper showing that every $3$ -connected ${K_{1, 3}, Γ_{3}}$ -free graph is Hamilton-connected, thus resolving one of the two last open cases in the characterization of pairs of connected forbidden subgraphs implying Hamilton-connectedness.

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Taxonomy

TopicsAdvanced Graph Theory Research · Complexity and Algorithms in Graphs · Interconnection Networks and Systems