Gromov--Witten Invariants of Non-Convex Complete Intersections in Weighted Projective Stacks

Felix Janda, Nawaz Sultani, Yang Zhou
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Abstract

In this paper we compute genus 0 orbifold Gromov--Witten invariants of Calabi--Yau threefold complete intersections in weighted projective stacks, regardless of convexity conditions. The traditional quantumn Lefschetz principle may fail even for invariants with ambient insertions. Using quasimap wall-crossing, we are able to compute invariants with insertions from a specific subring of the Chen--Ruan cohomology, which contains all the ambient cohomology classes. Quasimap wall-crossing gives a mirror theorem expressing the I-function in terms of the J-function via a mirror map. The key of this paper is to find a suitable GIT presentation of the target space, so that the mirror map is invertible. An explicit formula for the I-function is given for all those target spaces and many examples with explicit computations of invariants are provided.
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加权投影堆栈中非凸完全相交的格罗莫夫--维滕不变式
在本文中,我们不考虑凸性条件,计算了加权投影堆栈中Calabi--Yau 三折完全相交的0 属轨道Gromov--Witten不变式。传统的量柱拉夫谢茨原理甚至可能对有环境插入的不变式失效。利用准映射穿墙术,我们可以从陈-阮同构的特定子环计算有插入的不变量,该子环包含所有环境同构类。准映射穿墙给出了一个镜像定理,通过镜像映射表达了 I 函数与 J 函数之间的关系。本文的关键在于找到目标空间的合适 GIT 呈现,从而使镜像映射是可逆的。本文给出了所有目标空间的 I 函数的明确公式,并提供了许多明确计算不变式的例子。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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