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Autori principali: Argudo, Miguel Arcos, de Lacalle, Jesús García López, PozoCoronado, Luis Miguel
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2412.15788
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author Argudo, Miguel Arcos
de Lacalle, Jesús García López
PozoCoronado, Luis Miguel
author_facet Argudo, Miguel Arcos
de Lacalle, Jesús García López
PozoCoronado, Luis Miguel
contents This work shows a study about the structure of the cycles contained in a Minimal Strong Digraph (MSD). The structure of a given cycle is determined by the strongly connected components (or strong components, SCs) that appear after suppressing the arcs of the cycle. By this process and by the contraction of all SCs into single vertices we obtain a Hasse diagram from the MSD. Among other properties, we show that any SC conformed by more than one vertex (non trivial SC) has at least one linear vertex (a vertex with indegree and outdegree equal to 1) in the MSD (Theorem 1); that in the Hasse diagram at least one linear vertex exists for each non trivial maximal (resp. minimal) vertex (Theorem 2); that if an SC contains a number $λ$ of vertices of the cycle then it contains at least $λ$ linear vertices in the MSD (Theorem 3); and, finally, that given a cycle of length $q$ contained in the MSD, the number $α$ of linear vertices contained in the MSD satisfies $α\geq \lfloor (q+1)/2 \rfloor$ (Theorem 4).
format Preprint
id arxiv_https___arxiv_org_abs_2412_15788
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Structure of cycles in Minimal Strong Digraphs
Argudo, Miguel Arcos
de Lacalle, Jesús García López
PozoCoronado, Luis Miguel
Combinatorics
This work shows a study about the structure of the cycles contained in a Minimal Strong Digraph (MSD). The structure of a given cycle is determined by the strongly connected components (or strong components, SCs) that appear after suppressing the arcs of the cycle. By this process and by the contraction of all SCs into single vertices we obtain a Hasse diagram from the MSD. Among other properties, we show that any SC conformed by more than one vertex (non trivial SC) has at least one linear vertex (a vertex with indegree and outdegree equal to 1) in the MSD (Theorem 1); that in the Hasse diagram at least one linear vertex exists for each non trivial maximal (resp. minimal) vertex (Theorem 2); that if an SC contains a number $λ$ of vertices of the cycle then it contains at least $λ$ linear vertices in the MSD (Theorem 3); and, finally, that given a cycle of length $q$ contained in the MSD, the number $α$ of linear vertices contained in the MSD satisfies $α\geq \lfloor (q+1)/2 \rfloor$ (Theorem 4).
title Structure of cycles in Minimal Strong Digraphs
topic Combinatorics
url https://arxiv.org/abs/2412.15788