The Bruhat order on conjugation-invariant sets of involutions in the symmetric group

Abstract

Let In be the set of involutions in the symmetric group Sn, and for A ⊂eq \0,1,…,n\, let \[ FnA=\σ ∈ In σ has a fixed points for some a ∈ A\. \] We give a complete characterisation of the sets A for which FnA, with the order induced by the Bruhat order on Sn, is a graded poset. In particular, we prove that Fn\1\ (i.e., the set of involutions with exactly one fixed point) is graded, which settles a conjecture of Hultman in the affirmative. When FnA is graded, we give its rank function. We also give a short new proof of the EL-shellability of Fn\0\ (i.e., the set of fixed point-free involutions), which was recently proved by Can, Cherniavsky, and Twelbeck. Keywords: Bruhat order, symmetric group, involution, conjugacy class, graded poset, EL-shellability