# The vanishing cycles of curves in toric surfaces II

**Authors:** R\'emi Cr\'etois, Lionel Lang

arXiv: 1706.07252 · 2019-05-21

## TL;DR

This paper investigates the vanishing cycles of generic curves on toric surfaces, focusing on obstructions related to hyperelliptic involutions and Spin structures, and characterizes their monodromy groups.

## Contribution

It explicitly determines the monodromy subgroups preserving hyperelliptic and Spin structures, providing generators for the Spin mapping class group, advancing the understanding of vanishing cycles.

## Key findings

- Identifies monodromy groups preserving specific structures on curves.
- Provides explicit generators for the Spin mapping class group.
- Supports the conjecture on describing all vanishing cycles in this setting.

## Abstract

We resume the study initiated in \cite{CL}. For a generic curve $C$ in an ample linear system $\vert \mathcal{L} \vert$ on a toric surface $X$, a vanishing cycle of $C$ is an isotopy class of simple closed curve that can be contracted to a point along a degeneration of $C$ to a nodal curve in $\vert \mathcal{L} \vert$. The obstructions that prevent a simple closed curve in $C$ from being a vanishing cycle are encoded by the adjoint line bundle $K_X \otimes \mathcal{L}$. In this paper, we consider the linear systems carrying the two simplest types of obstruction. Geometrically, these obstructions manifest on $C$ respectively as an hyperelliptic involution and as a Spin structure. In both cases, we determine all the vanishing cycles by investigating the associated monodromy maps, whose target space is the mapping class group $MCG(C)$. We show that the image of the monodromy is the subgroup of $MCG(C)$ preserving respectively the hyperelliptic involution and the Spin structure. In particular, we provide an explicit finite set of generators for the Spin mapping class group. The results obtained here support the Conjecture $1$ in \cite{CL} aiming to describe all the vanishing cycles for any pair $(X, \mathcal{L})$.

## Full text

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## Figures

8 figures with captions in the complete paper: https://tomesphere.com/paper/1706.07252/full.md

## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1706.07252/full.md

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Source: https://tomesphere.com/paper/1706.07252