Cihan Bahran
Published 2018-08-07Version 1
For a fixed prime $p$, we consider a filtration of the commuting complex of elements of order $p$ in the symmetric group $\mathfrak{S}_n$. The filtration is obtained by imposing successively relaxed bounds on the number of disjoint $p$-cycles in the cycle decomposition of the elements. We show that each term in the filtration becomes highly acyclic as $n$ increases. We use $\mathbf{FI}$-modules in the proof.
On algebras of double cosets of symmetric groups with respect to Young subgroups
The maximal number of elements pairwise generating the symmetric group of even degree
Correction of a theorem on the symmetric group generated by transvections
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