Christina Savvidou
Published 2012-12-06, updated 2013-01-21Version 3
The derangement polynomial for the symmetric group enumerates derangements by the number of excedances. It can be interpreted as the local $h$-polynomial, in the sense of Stanley, of the barycentric subdivision of the simplex. Motivated by this interpretation, we define a derangement polynomial for the even-signed permutation group. The coefficients of this polynomial are nonnegative, symmetric and unimodal. We show that they enumerate derangements in the even-signed permutation group according to a notion of excedance, which is analogous to the one introduced by Brenti for signed permutations. We also give an explicit formula for the corresponding exponential generating function.
Comments: This paper has been withdrawn by the author due to an error in the proof of the main theorem that cancels the theorem. It will be replaced by a new article with similar content
A symmetric unimodal decomposition of the derangement polynomial of type $B$
Local $h$-vectors of Quasi-Geometric and Barycentric Subdivisions
Face numbers of barycentric subdivisions of cubical complexes
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