Revisiting the Hamiltonian Theme in the Square of a Block: The General Case
This is the second part of joint research in which we show that every $2$-connected graph $G$ has the ${\cal F}_4$ property. That is, given distinct $x_i\in V(G)$, $1\leq i\leq 4$, there is an $x_1x_2$-hamiltonian path in $G^2$ containing different edges $x_3y_3, x_4y_4\in E(G)$ for some $y_3,y_4\in...
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| Format: | Artikel |
| Sprache: | eng |
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| Zusammenfassung: | This is the second part of joint research in which we show that every
$2$-connected graph $G$ has the ${\cal F}_4$ property. That is, given distinct
$x_i\in V(G)$, $1\leq i\leq 4$, there is an $x_1x_2$-hamiltonian path in $G^2$
containing different edges $x_3y_3, x_4y_4\in E(G)$ for some $y_3,y_4\in V(G)$.
However, it was shown already in \cite[Theorem 2]{cf1:refer} that 2-connected
DT-graphs have the ${\cal F}_4$ property; based on this result we generalize it
to arbitrary $2$-connected graphs. We also show that these results are best
possible. |
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| DOI: | 10.48550/arxiv.1805.04378 |