The commuting complex of the symmetric group with bounded number of p-cycles
Abstract
For a fixed prime p, we consider a filtration of the commuting complex of elements of order p in the symmetric group Sn. 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 FI-modules in the proof.
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