• Title of article

    Closures of positive braids and the Morton–Franks–Williams inequality

  • Author/Authors

    Volker and Gonzلlez-Meneses، نويسنده , , J. and Manchَn، نويسنده , , P.M.G.، نويسنده ,

  • Issue Information
    دوماهنامه با شماره پیاپی سال 2014
  • Pages
    11
  • From page
    14
  • To page
    24
  • Abstract
    We study the Morton–Franks–Williams inequality for closures of simple braids (also known as positive permutation braids). This allows to prove, in a simple way, that the set of simple braids is an orthonormal basis for the inner product of the Hecke algebra of the braid group defined by Kálmán, who first obtained this result by using an interesting connection with Contact Topology. o introduce a new technique to study the Homflypt polynomial for closures of positive braids, namely resolution trees whose leaves are simple braids. In terms of these simple resolution trees, we characterize closed positive braids for which the Morton–Franks–Williams inequality is strict. In particular, we determine explicitly the positive braid words on three strands whose closures have braid index three.
  • Keywords
    Braid index , Positive braid , Morton–Franks–Williams inequality , HOMFLYPT polynomial
  • Journal title
    Topology and its Applications
  • Serial Year
    2014
  • Journal title
    Topology and its Applications
  • Record number

    1584319