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Higher genus Gromov-Witten correspondences for smooth log Calabi-Yau pairs

组织者

阿尔坦·谢什马尼 , 杨南君 , 袁北彗

演讲者

Benjamin Zhou

时间

2025年02月13日 15:00 至 16:00

地点

A6-101

线上

Zoom 638 227 8222 (BIMSA)

摘要

We prove higher genus correspondences between open, closed, and logarithmic Gromov-Witten invariants that can be defined from a smooth log Calabi-Yau pair $(X, E)$ consisting of a toric Fano surface $X$ with a smooth elliptic curve $E$. Techniques such as the degeneration formula for logarithmic Gromov-Witten invariants, the Topological Vertex, and constructions from Gross-Siebert mirror symmetry are used. Time permitting, we also describe a link with $q$-refined theta functions defined from $(X,E)$ and open mirror symmetry of an outer Aganagic-Vafa brane in $K_X$. This is part of joint work with Tim Gräfnitz, Helge Ruddat, and Eric Zaslow.