Quantum K theory for flag varieties
Abstract
Forgetting a subspace from a partial flag yields another partial flag composed of fewer subspaces. This induces a forgetful map between the corresponding flag varieties. We prove here that, for a degree large enough, the variety associated with degree d stable maps sending their marked points within Schubert varieties of is a rationally connected fibration over its image, which parametrizes degree stable maps sending their marked points within the Schubert varieties of . The Euler characteristic of these varieties are quantum -invariants. Our result implies equalities between quantum correlators. We extend these equalities to the equivariant setting. Finally, we study the small quantum -ring of the universal hyperplane . We prove a Chevalley formula in via geometrical analysis of the space of stale maps to and of its image via evaluation maps.
Cite
@article{arxiv.2202.00773,
title = {Quantum K theory for flag varieties},
author = {Sybille Rosset},
journal= {arXiv preprint arXiv:2202.00773},
year = {2022}
}
Comments
PhD thesis