• Title of article

    A recipe theorem for the topological Tutte polynomial of Bollobلs and Riordan

  • Author/Authors

    Joanna A. Ellis-Monaghan، نويسنده , , Joanna A. and Sarmiento، نويسنده , , Irasema، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    13
  • From page
    782
  • To page
    794
  • Abstract
    In [2,3], Bollobás and Riordan (2001, 2002) generalized the classical Tutte polynomial to graphs cellularly embedded in surfaces, i.e., ribbon graphs, thus encoding topological information not captured by the classical Tutte polynomial. We provide a ‘recipe theorem’ restating the universality property of this topological Tutte polynomial, R ( G ) . We then relate R ( G ) to the generalized transition polynomial Q ( G ) of Ellis-Monaghan and Sarmiento (2002) [18] via a medial graph construction, thus extending the relation between the classical Tutte polynomial and the Martin, or circuit partition, polynomial to ribbon graphs. We use this relation to prove a duality property for R ( G ) that holds for both orientable and unorientable ribbon graphs. We conclude by placing the results of Chumutov and Pak (2007) [11] for virtual links in the context of the relation between R ( G ) and Q ( G ) .
  • Journal title
    European Journal of Combinatorics
  • Serial Year
    2011
  • Journal title
    European Journal of Combinatorics
  • Record number

    1549714