Digraph redicolouring
Given two $k$-dicolourings of a digraph $D$, we prove that it is PSPACE-complete to decide whether we can transform one into the other by recolouring one vertex at each step while maintaining a dicolouring at any step even for $k=2$ and for digraphs with maximum degree $5$ or oriented planar graphs...
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| creator | Bousquet, Nicolas Havet, Frédéric Nisse, Nicolas Picasarri-Arrieta, Lucas Reinald, Amadeus |
| description | Given two $k$-dicolourings of a digraph $D$, we prove that it is
PSPACE-complete to decide whether we can transform one into the other by
recolouring one vertex at each step while maintaining a dicolouring at any step
even for $k=2$ and for digraphs with maximum degree $5$ or oriented planar
graphs with maximum degree $6$. A digraph is said to be $k$-mixing if there
exists a transformation between any pair of $k$-colourings. We show that every
digraph $D$ is $k$-mixing for all $k\geq \delta^*_{\min}(D)+2$, generalizing a
result due to Dyer et al. We also prove that every oriented graph $\vec{G}$ is
$k$-mixing for all $k\geq \delta^*_{\max}(\vec{G}) +1$ and for all $k\geq
\delta^*_{\rm avg}(\vec{G})+1$. We conjecture that, for every digraph $D$, the
dicolouring graph of $D$ on $k\geq \delta_{\min}^*(D)+2$ colours has diameter
at most $O(|V(D)|^2)$ and give some evidences. We first prove that the
dicolouring graph of any digraph $D$ on $k\geq 2\delta_{\min}^*(D) + 2$ colours
has linear diameter, extending a result from Bousquet and Perarnau. We also
prove that the conjecture is true when $k\geq
\frac{3}{2}(\delta_{\min}^*(D)+1)$. Restricted to the special case of oriented
graphs, we prove that the dicolouring graph of any subcubic oriented graph on
$k\geq 2$ colours is connected and has diameter at most $2n$. We conjecture
that every non $2$-mixing oriented graph has maximum average degree at least
$4$, and we provide some support for this conjecture by proving it on the
special case of $2$-freezable oriented graphs. More generally, we show that
every $k$-freezable oriented graph on $n$ vertices must contain at least $kn +
k(k-2)$ arcs, and we give a family of $k$-freezable oriented graphs that reach
this bound. In the general case, we prove as a partial result that every non
$2$-mixing oriented graph has maximum average degree at least $\frac{7}{2}$. |
| doi_str_mv | 10.48550/arxiv.2301.03417 |
| format | Article |
| fullrecord | <record><control><sourceid>arxiv_GOX</sourceid><recordid>TN_cdi_arxiv_primary_2301_03417</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>2301_03417</sourcerecordid><originalsourceid>FETCH-LOGICAL-a677-7de65a46ba16ea4b3460eac0cfdf77a975790e90795b6896a16655c02ce2923</originalsourceid><addsrcrecordid>eNotzrkKwkAUheFpLCRaWljpCyTeZJabKSWuEBDEPtxMJnEgLowo-vZqtDrNz-FjbBxDJFIpYUb-6R5RwiGOgIsY-2y0cI2n63HqbeXMpb3cvTs3A9arqb3Z4X8Dtl8tD9kmzHfrbTbPQ1KIIVZWSRKqpFhZEiUXCiwZMHVVI5JGiRqsBtSyVKlWn0xJaSAxNtEJD9jkd9qpiqt3J_Kv4qsrOh1_A3AiMyc</addsrcrecordid><sourcetype>Open Access Repository</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype></control><display><type>article</type><title>Digraph redicolouring</title><source>arXiv.org</source><creator>Bousquet, Nicolas ; Havet, Frédéric ; Nisse, Nicolas ; Picasarri-Arrieta, Lucas ; Reinald, Amadeus</creator><creatorcontrib>Bousquet, Nicolas ; Havet, Frédéric ; Nisse, Nicolas ; Picasarri-Arrieta, Lucas ; Reinald, Amadeus</creatorcontrib><description>Given two $k$-dicolourings of a digraph $D$, we prove that it is
PSPACE-complete to decide whether we can transform one into the other by
recolouring one vertex at each step while maintaining a dicolouring at any step
even for $k=2$ and for digraphs with maximum degree $5$ or oriented planar
graphs with maximum degree $6$. A digraph is said to be $k$-mixing if there
exists a transformation between any pair of $k$-colourings. We show that every
digraph $D$ is $k$-mixing for all $k\geq \delta^*_{\min}(D)+2$, generalizing a
result due to Dyer et al. We also prove that every oriented graph $\vec{G}$ is
$k$-mixing for all $k\geq \delta^*_{\max}(\vec{G}) +1$ and for all $k\geq
\delta^*_{\rm avg}(\vec{G})+1$. We conjecture that, for every digraph $D$, the
dicolouring graph of $D$ on $k\geq \delta_{\min}^*(D)+2$ colours has diameter
at most $O(|V(D)|^2)$ and give some evidences. We first prove that the
dicolouring graph of any digraph $D$ on $k\geq 2\delta_{\min}^*(D) + 2$ colours
has linear diameter, extending a result from Bousquet and Perarnau. We also
prove that the conjecture is true when $k\geq
\frac{3}{2}(\delta_{\min}^*(D)+1)$. Restricted to the special case of oriented
graphs, we prove that the dicolouring graph of any subcubic oriented graph on
$k\geq 2$ colours is connected and has diameter at most $2n$. We conjecture
that every non $2$-mixing oriented graph has maximum average degree at least
$4$, and we provide some support for this conjecture by proving it on the
special case of $2$-freezable oriented graphs. More generally, we show that
every $k$-freezable oriented graph on $n$ vertices must contain at least $kn +
k(k-2)$ arcs, and we give a family of $k$-freezable oriented graphs that reach
this bound. In the general case, we prove as a partial result that every non
$2$-mixing oriented graph has maximum average degree at least $\frac{7}{2}$.</description><identifier>DOI: 10.48550/arxiv.2301.03417</identifier><language>eng</language><subject>Computer Science - Discrete Mathematics ; Mathematics - Combinatorics</subject><creationdate>2023-01</creationdate><rights>http://creativecommons.org/licenses/by-nc-nd/4.0</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>228,230,776,881</link.rule.ids><linktorsrc>$$Uhttps://arxiv.org/abs/2301.03417$$EView_record_in_Cornell_University$$FView_record_in_$$GCornell_University$$Hfree_for_read</linktorsrc><backlink>$$Uhttps://doi.org/10.48550/arXiv.2301.03417$$DView paper in arXiv$$Hfree_for_read</backlink></links><search><creatorcontrib>Bousquet, Nicolas</creatorcontrib><creatorcontrib>Havet, Frédéric</creatorcontrib><creatorcontrib>Nisse, Nicolas</creatorcontrib><creatorcontrib>Picasarri-Arrieta, Lucas</creatorcontrib><creatorcontrib>Reinald, Amadeus</creatorcontrib><title>Digraph redicolouring</title><description>Given two $k$-dicolourings of a digraph $D$, we prove that it is
PSPACE-complete to decide whether we can transform one into the other by
recolouring one vertex at each step while maintaining a dicolouring at any step
even for $k=2$ and for digraphs with maximum degree $5$ or oriented planar
graphs with maximum degree $6$. A digraph is said to be $k$-mixing if there
exists a transformation between any pair of $k$-colourings. We show that every
digraph $D$ is $k$-mixing for all $k\geq \delta^*_{\min}(D)+2$, generalizing a
result due to Dyer et al. We also prove that every oriented graph $\vec{G}$ is
$k$-mixing for all $k\geq \delta^*_{\max}(\vec{G}) +1$ and for all $k\geq
\delta^*_{\rm avg}(\vec{G})+1$. We conjecture that, for every digraph $D$, the
dicolouring graph of $D$ on $k\geq \delta_{\min}^*(D)+2$ colours has diameter
at most $O(|V(D)|^2)$ and give some evidences. We first prove that the
dicolouring graph of any digraph $D$ on $k\geq 2\delta_{\min}^*(D) + 2$ colours
has linear diameter, extending a result from Bousquet and Perarnau. We also
prove that the conjecture is true when $k\geq
\frac{3}{2}(\delta_{\min}^*(D)+1)$. Restricted to the special case of oriented
graphs, we prove that the dicolouring graph of any subcubic oriented graph on
$k\geq 2$ colours is connected and has diameter at most $2n$. We conjecture
that every non $2$-mixing oriented graph has maximum average degree at least
$4$, and we provide some support for this conjecture by proving it on the
special case of $2$-freezable oriented graphs. More generally, we show that
every $k$-freezable oriented graph on $n$ vertices must contain at least $kn +
k(k-2)$ arcs, and we give a family of $k$-freezable oriented graphs that reach
this bound. In the general case, we prove as a partial result that every non
$2$-mixing oriented graph has maximum average degree at least $\frac{7}{2}$.</description><subject>Computer Science - Discrete Mathematics</subject><subject>Mathematics - Combinatorics</subject><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2023</creationdate><recordtype>article</recordtype><sourceid>GOX</sourceid><recordid>eNotzrkKwkAUheFpLCRaWljpCyTeZJabKSWuEBDEPtxMJnEgLowo-vZqtDrNz-FjbBxDJFIpYUb-6R5RwiGOgIsY-2y0cI2n63HqbeXMpb3cvTs3A9arqb3Z4X8Dtl8tD9kmzHfrbTbPQ1KIIVZWSRKqpFhZEiUXCiwZMHVVI5JGiRqsBtSyVKlWn0xJaSAxNtEJD9jkd9qpiqt3J_Kv4qsrOh1_A3AiMyc</recordid><startdate>20230109</startdate><enddate>20230109</enddate><creator>Bousquet, Nicolas</creator><creator>Havet, Frédéric</creator><creator>Nisse, Nicolas</creator><creator>Picasarri-Arrieta, Lucas</creator><creator>Reinald, Amadeus</creator><scope>AKY</scope><scope>AKZ</scope><scope>GOX</scope></search><sort><creationdate>20230109</creationdate><title>Digraph redicolouring</title><author>Bousquet, Nicolas ; Havet, Frédéric ; Nisse, Nicolas ; Picasarri-Arrieta, Lucas ; Reinald, Amadeus</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-a677-7de65a46ba16ea4b3460eac0cfdf77a975790e90795b6896a16655c02ce2923</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2023</creationdate><topic>Computer Science - Discrete Mathematics</topic><topic>Mathematics - Combinatorics</topic><toplevel>online_resources</toplevel><creatorcontrib>Bousquet, Nicolas</creatorcontrib><creatorcontrib>Havet, Frédéric</creatorcontrib><creatorcontrib>Nisse, Nicolas</creatorcontrib><creatorcontrib>Picasarri-Arrieta, Lucas</creatorcontrib><creatorcontrib>Reinald, Amadeus</creatorcontrib><collection>arXiv Computer Science</collection><collection>arXiv Mathematics</collection><collection>arXiv.org</collection></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext_linktorsrc</fulltext></delivery><addata><au>Bousquet, Nicolas</au><au>Havet, Frédéric</au><au>Nisse, Nicolas</au><au>Picasarri-Arrieta, Lucas</au><au>Reinald, Amadeus</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Digraph redicolouring</atitle><date>2023-01-09</date><risdate>2023</risdate><abstract>Given two $k$-dicolourings of a digraph $D$, we prove that it is
PSPACE-complete to decide whether we can transform one into the other by
recolouring one vertex at each step while maintaining a dicolouring at any step
even for $k=2$ and for digraphs with maximum degree $5$ or oriented planar
graphs with maximum degree $6$. A digraph is said to be $k$-mixing if there
exists a transformation between any pair of $k$-colourings. We show that every
digraph $D$ is $k$-mixing for all $k\geq \delta^*_{\min}(D)+2$, generalizing a
result due to Dyer et al. We also prove that every oriented graph $\vec{G}$ is
$k$-mixing for all $k\geq \delta^*_{\max}(\vec{G}) +1$ and for all $k\geq
\delta^*_{\rm avg}(\vec{G})+1$. We conjecture that, for every digraph $D$, the
dicolouring graph of $D$ on $k\geq \delta_{\min}^*(D)+2$ colours has diameter
at most $O(|V(D)|^2)$ and give some evidences. We first prove that the
dicolouring graph of any digraph $D$ on $k\geq 2\delta_{\min}^*(D) + 2$ colours
has linear diameter, extending a result from Bousquet and Perarnau. We also
prove that the conjecture is true when $k\geq
\frac{3}{2}(\delta_{\min}^*(D)+1)$. Restricted to the special case of oriented
graphs, we prove that the dicolouring graph of any subcubic oriented graph on
$k\geq 2$ colours is connected and has diameter at most $2n$. We conjecture
that every non $2$-mixing oriented graph has maximum average degree at least
$4$, and we provide some support for this conjecture by proving it on the
special case of $2$-freezable oriented graphs. More generally, we show that
every $k$-freezable oriented graph on $n$ vertices must contain at least $kn +
k(k-2)$ arcs, and we give a family of $k$-freezable oriented graphs that reach
this bound. In the general case, we prove as a partial result that every non
$2$-mixing oriented graph has maximum average degree at least $\frac{7}{2}$.</abstract><doi>10.48550/arxiv.2301.03417</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Computer Science - Discrete Mathematics Mathematics - Combinatorics |
| title | Digraph redicolouring |
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