Generating strongly 2-connected digraphs
We prove that there exist four operations such that given any two strongly $2$-connected digraphs $H$ and $D$ where $H$ is a butterfly-minor of $D$, there exists a sequence $D_0,\dots, D_n$ where $D_0=H$, $D_n=D$ and for every $0\leq i\leq n-1$, $D_i$ is a strongly $2$-connected butterfly-minor of $...
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| Sprache: | eng |
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| Zusammenfassung: | We prove that there exist four operations such that given any two strongly
$2$-connected digraphs $H$ and $D$ where $H$ is a butterfly-minor of $D$, there
exists a sequence $D_0,\dots, D_n$ where $D_0=H$, $D_n=D$ and for every $0\leq
i\leq n-1$, $D_i$ is a strongly $2$-connected butterfly-minor of $D_{i+1}$
which is obtained by a single application of one of the four operations.
As a consequence of this theorem, we obtain that every strongly $2$-connected
digraph can be generated from a concise family of strongly $2$-connected
digraphs by using these four operations. |
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| DOI: | 10.48550/arxiv.2411.09791 |