• Title of article

    Fully Optimal Bases and the Active Bijection in Graphs, Hyperplane Arrangements, and Oriented Matroids

  • Author/Authors

    Gioan، نويسنده , , Emeric and Las Vergnas، نويسنده , , Michel، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2007
  • Pages
    7
  • From page
    365
  • To page
    371
  • Abstract
    In this note, we present the main results of a series of forthcoming papers, dealing with bi-jective generalizations of some counting formulas. New intrinsic constructions in oriented matroids on a linearly ordered set of elements establish notably structural links between counting regions and linear programming. We introduce fully optimal bases, which have a simple combinatorial characterization, and strengthen the well-known optimal bases of linear programming. Our main result is that every bounded region of an ordered hyperplane arrangement, or ordered oriented matroid, has a unique fully optimal basis, providing the active bijection between bounded regions and uniactive internal bases. The active bijec-tion is extended to an activity preserving mapping between all reorientations and all bases of an ordered oriented matroid. It gives a bijective interpretation of the equality of two expressions for the Tutte polynomial, as well as a new expression of this polynomial in terms of beta invariants of minors. There are several refinements, such as an activity preserving bijection between regions (acyclic reorientations) and no-broken-circuit subsets, and others in terms of hyperplane arrangements, graphs, and permutations.
  • Keywords
    Hyperplane arrangement , graph , Linear programming , Tutte polynomial , optimal basis , reorientation , bijection , Basis , Region , no broken circuit , Oriented matroid
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Serial Year
    2007
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Record number

    1454744