Enumerative geometry of the mirror quintic

Sheldon Katz; David R. Morrison

arXiv:2204.01669·math.AG·April 5, 2022

Enumerative geometry of the mirror quintic

Sheldon Katz, David R. Morrison

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TL;DR

This paper computes low-degree enumerative invariants of the mirror quintic threefold, providing insights into its geometric properties and contributing to the understanding of mirror symmetry in algebraic geometry.

Contribution

It offers explicit calculations of enumerative invariants for the mirror quintic, advancing the understanding of its enumerative geometry.

Findings

01

Explicit low-degree invariants computed

02

Enhanced understanding of mirror symmetry

03

New data for mirror quintic geometry

Abstract

We evaluate the enumerative invariants of low degree on the mirror quintic threefold.

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Taxonomy

TopicsAlgebraic structures and combinatorial models · Homotopy and Cohomology in Algebraic Topology · Algebraic Geometry and Number Theory