Polygon dissections and some generalizations of cluster complexes
Abstract
Let W be a Weyl group corresponding to the root system An-1 or Bn. We define a simplicial complex mW in terms of polygon dissections for such a group and any positive integer m. For m=1 , mW is isomorphic to the cluster complex corresponding to W , defined in FZ. We enumerate the faces of mW and show that the entries of its h-vector are given by the generalized Narayana numbers NmW(i) , defined in Atha3. We also prove that for any m ≥ 1 the complex mW is shellable and hence Cohen-Macaulay.
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