• Title of article

    The chromatic number of almost stable Kneser hypergraphs

  • Author/Authors

    Meunier، نويسنده , , Frédéric، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    9
  • From page
    1820
  • To page
    1828
  • Abstract
    Let V ( n , k , s ) be the set of k-subsets S of [ n ] such that for all i , j ∈ S , we have | i − j | ⩾ s . We define almost s-stable Kneser hypergraph KG r ( [ n ] k ) s - stab ∼ to be the r-uniform hypergraph whose vertex set is V ( n , k , s ) and whose edges are the r-tuples of disjoint elements of V ( n , k , s ) . he help of a Z p -Tucker lemma, we prove that, for p prime and for any n ⩾ k p , the chromatic number of almost 2-stable Kneser hypergraphs KG p ( [ n ] k ) 2 - stab ∼ is equal to the chromatic number of the usual Kneser hypergraphs KG p ( [ n ] k ) , namely that it is equal to ⌈ n − ( k − 1 ) p p − 1 ⌉ . d results are also proved, in particular, a short combinatorial proof of Schrijverʼs theorem (about the chromatic number of stable Kneser graphs) and some evidences are given for a new conjecture concerning the chromatic number of usual s-stable r-uniform Kneser hypergraphs.
  • Keywords
    Z p -Tucker lemma , chromatic number , Stable Kneser hypergraphs , Combinatorial topology
  • Journal title
    Journal of Combinatorial Theory Series A
  • Serial Year
    2011
  • Journal title
    Journal of Combinatorial Theory Series A
  • Record number

    1531674