A positive formula for type A Peterson Schubert calculus

Abstract

Peterson varieties are special nilpotent Hessenberg varieties that have appeared in the study of quantum cohomology, representation theory, and combinatorics. In type A, the Peterson variety Y is a subvariety of the complete flag variety Fl(n; C), and is invariant under the action of a subgroup S C* of T, where T is the standard (noncompact) torus acting on Fl(n; C). Using the Peterson Schubert basis introduced by Harada and Tymoczko obtained by restricting a specific set of Schubert classes from HT*(Fl(n; C)) to HS*(Y), we describe the product structure of the equivariant cohomology HS*(Y). In particular, we show that the product is manifestly positive in an appropriate sense by providing an explicit positive combinatorial formula for its structure constants. Our method requires a new combinatorial identity of binomial coefficients that generalizes Vandermonde's identity.