Fixed-point-free involutions and Schur P-positivity

Abstract

The orbits of the symplectic group acting on the type A flag variety are indexed by the fixed-point-free involutions in a finite symmetric group. The cohomology classes of the closures of these orbits have polynomial representatives SFPFz akin to Schubert polynomials. We show that the fixed-point-free involution Stanley symmetric functions FFPFz, which are stable limits of the polynomials SFPFz, are Schur P-positive. To do so, we construct an analogue of the Lascoux-Sch\"utzenberger tree, an algebraic recurrence that computes Schubert polynomials. As a byproduct of our proof, we obtain a Pfaffian formula of geometric interest for SFPFz when z is a fixed-point-free version of a Grassmannian permutation. We also classify the fixed-point-free involution Stanley symmetric functions that are single Schur P-functions, and show that the decomposition of FFPFz into Schur P-functions is unitriangular with respect to dominance order on strict partitions. These results and proofs mirror previous work by the authors related to the orthogonal group action on the type A flag variety.