Essec\Faculty\Model\Contribution {#2205
  #_index: "academ_contributions"
  #_id: "13119"
  #_source: array:26 [
    "id" => "13119"
    "slug" => "polyhedral-studies-on-vertex-coloring-polytope-the-standard-formulation"
    "yearMonth" => "2016-08"
    "year" => "2016"
    "title" => "Polyhedral studies on vertex coloring polytope: The standard formulation"
    "description" => "DELLE DONNE, D. et MARENCO, J. (2016). Polyhedral studies on vertex coloring polytope: The standard formulation. <i>Discrete Optimization</i>, 21(1), pp. 1-13."
    "authors" => array:2 [
      0 => array:3 [
        "name" => "DELLE DONNE Diego"
        "bid" => "B00788133"
        "slug" => "delle-donne-diego"
      ]
      1 => array:1 [
        "name" => "MARENCO Javier"
      ]
    ]
    "ouvrage" => ""
    "keywords" => []
    "updatedAt" => "2023-01-27 01:00:44"
    "publicationUrl" => "https://doi.org/10.1016/j.disopt.2016.05.001"
    "publicationInfo" => array:3 [
      "pages" => "1-13"
      "volume" => "21"
      "number" => "1"
    ]
    "type" => array:2 [
      "fr" => "Articles"
      "en" => "Journal articles"
    ]
    "support_type" => array:2 [
      "fr" => "Revue scientifique"
      "en" => "Scientific journal"
    ]
    "countries" => array:2 [
      "fr" => null
      "en" => null
    ]
    "abstract" => array:2 [
      "fr" => "Despite the fact that many vertex coloring problems are polynomially solvable on certain graph classes, most of these problems are not “under control” from a polyhedral point of view. The equivalence between optimization and separation suggests the existence of integer programming formulations for these problems whose associated polytopes admit elegant characterizations. In this work we address this issue. As a starting point, we focus our attention on the well-known standard formulation for the classical vertex coloring problem."
      "en" => "Despite the fact that many vertex coloring problems are polynomially solvable on certain graph classes, most of these problems are not “under control” from a polyhedral point of view. The equivalence between optimization and separation suggests the existence of integer programming formulations for these problems whose associated polytopes admit elegant characterizations. In this work we address this issue. As a starting point, we focus our attention on the well-known standard formulation for the classical vertex coloring problem."
    ]
    "authors_fields" => array:2 [
      "fr" => "Systèmes d’Information, Sciences de la Décision et Statistiques"
      "en" => "Information Systems, Decision Sciences and Statistics"
    ]
    "indexedAt" => "2024-05-01T21:21:48.000Z"
    "docTitle" => "Polyhedral studies on vertex coloring polytope: The standard formulation"
    "docSurtitle" => "Articles"
    "authorNames" => "<a href="/cv/delle-donne-diego">DELLE DONNE Diego</a>, MARENCO Javier"
    "docDescription" => "<span class="document-property-authors">DELLE DONNE Diego, MARENCO Javier</span><br><span class="document-property-authors_fields">Systèmes d’Information, Sciences de la Décision et Statistiques</span> | <span class="document-property-year">2016</span>"
    "keywordList" => ""
    "docPreview" => "<b>Polyhedral studies on vertex coloring polytope: The standard formulation</b><br><span>2016-08 | Articles </span>"
    "docType" => "research"
    "publicationLink" => "<a href="https://doi.org/10.1016/j.disopt.2016.05.001" target="_blank">Polyhedral studies on vertex coloring polytope: The standard formulation</a>"
  ]
  +lang: "fr"
  +"_type": "_doc"
  +"_score": 8.769599
  +"parent": null
}