Combinatorial Invariance of Kazhdan-Lusztig-Vogan Polyomials for Fixed Point Free Involutions

Abstract

When Sp(2n,C) acts on the flag variety of SL(2n,C), the orbits are in bijection with fixed point free involutions in the symmetric group S2n. In this case, the associated Kazhdan-Lusztig-Vogan polynomials Pv,u can be indexed by pairs of fixed point free involutions v≥ u, where ≥ denotes the Bruhat order on S2n. We prove that these polynomials are combinatorial invariants in the sense that if f: [u, w0 ] → [u , w0] is a poset isomorphism of upper intervals in the Bruhat order on fixed point free involutions, then Pv,u = Pf(v),u for all v ≥ u.