Schubert induction
Abstract
We describe a Schubert induction theorem, a tool for analyzing intersections on a Grassmannian over an arbitrary base ring. The key ingredient in the proof is the Geometric Littlewood-Richardson rule, described in a companion paper. Schubert problems are among the most classical problems in enumerative geometry of continuing interest. As an application of Schubert induction, we address several long-standing natural questions related to Schubert problems, including: the "reality" of solutions; effective numerical methods; solutions over algebraically closed fields of positive characteristic; solutions over finite fields; a generic smoothness (Kleiman-Bertini) theorem; and monodromy groups of Schubert problems. These methods conjecturally extend to the flag variety.
Cite
@article{arxiv.math/0302296,
title = {Schubert induction},
author = {Ravi Vakil},
journal= {arXiv preprint arXiv:math/0302296},
year = {2007}
}
Comments
22 pages, 13 figures; v2 with new application: surprising examples where the Galois/monodromy group is small, inspired by H. Derksen. The groups are computed using Schubert induction