Mirror symmetry for certain blowups of Grassmannians

Jianxun Hu; Huazhong Ke; Changzheng Li; Lei Song

arXiv:2502.13545·math.AG·February 20, 2025

Mirror symmetry for certain blowups of Grassmannians

Jianxun Hu, Huazhong Ke, Changzheng Li, Lei Song

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TL;DR

This paper classifies when certain blowups of Grassmannians are Fano, computes key Gromov-Witten invariants, and establishes a mirror symmetry correspondence for specific blowups using toric superpotentials.

Contribution

It provides a classification of Fano blowups of Grassmannians and proves a mirror symmetry isomorphism for a particular class of these blowups.

Findings

01

Classification of Fano blowups of Grassmannians.

02

Computation of almost all two-point, genus zero Gromov-Witten invariants.

03

Establishment of mirror symmetry via toric superpotentials and Jacobi ring isomorphism.

Abstract

We classify when the blowup of a complex Grassmannian $G (k, n)$ along a smooth Schubert subvariety $Z$ is Fano. We compute almost all the two-point, genus zero Gromov-Witten invariants of the blowup when $Z = G (k, n - 1)$ . We further prove a mirror symmetry statement for the blowup $X_{2, n}$ of $G (2, n)$ along $G (2, n - 1)$ , by introducing a toric superpotential $f_{tor}$ and showing the isomorphism between the Jacobi ring of $f_{tor}$ and the small quantum cohomology ring $Q H^{*} (X_{2, n})$ .

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Taxonomy

TopicsMathematics and Applications · Advanced Differential Geometry Research · Geometric Analysis and Curvature Flows