Fan Wei
Published 2010-09-29Version 1
In this paper we consider the rank generating function of a separable permutation $\pi$ in the weak Bruhat order on the two intervals $[\text{id}, \pi]$ and $[\pi, w_0]$, where $w_0 = n,(n-1),..., 1$. We show a surprising result that the product of these two generating functions is the generating function for the symmetric group with the weak order. We then obtain explicit formulas for the rank generating functions on $[\text{id}, \pi]$ and $[\pi, w_0]$, which leads to the rank-symmetry and unimodality of the two graded posets.
Distribution of Random Variables on the Symmetric Group
Constructing all irreducible Specht modules in a block of the symmetric group
Transitive factorisations in the symmetric group, and combinatorial aspects of singularity theory
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