Gromov–Witten theory of complete intersections via nodal invariants

Pub Date : 2023-02-17 DOI:10.1112/topo.12284
Hülya Argüz, Pierrick Bousseau, Rahul Pandharipande, Dimitri Zvonkine
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引用次数: 5

Abstract

We provide an inductive algorithm computing Gromov–Witten invariants in all genera with arbitrary insertions of all smooth complete intersections in projective space. We also prove that all Gromov–Witten classes of all smooth complete intersections in projective space belong to the tautological ring of the moduli space of stable curves. The main idea is to show that invariants with insertions of primitive cohomology classes are controlled by their monodromy and by invariants defined without primitive insertions but with imposed nodes in the domain curve. To compute these nodal Gromov–Witten invariants, we introduce the new notion of nodal relative Gromov–Witten invariants. We then prove a nodal degeneration formula and a relative splitting formula. These results for nodal relative Gromov–Witten theory are stated in complete generality and are of independent interest.

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通过节点不变量的完全交的Gromov-Witten理论
给出了一种计算投影空间中所有光滑完全交的任意插入的所有属的Gromov-Witten不变量的归纳算法。证明了投影空间中所有光滑完全交的Gromov-Witten类都属于稳定曲线模空间的重言环。本文的主要思想是证明带有插入基元上同类的不变量由基元上同类的单一性和没有插入基元但在域曲线上有强加节点的不变量控制。为了计算这些节点Gromov-Witten不变量,我们引入了节点相对Gromov-Witten不变量的新概念。然后证明了一个节退化公式和一个相对分裂公式。节点相对Gromov-Witten理论的这些结果是完全一般性的,具有独立的意义。
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