# Genus One Belyi Maps by Quadratic Correspondences

**Authors:** Raimundas Vidunas, Yang-Hui He

arXiv: 1706.04258 · 2019-07-16

## TL;DR

This paper introduces a quadratic correspondence method to derive genus one Belyi maps from sphere maps, enabling efficient computation and solving longstanding examples in mathematical physics.

## Contribution

It presents a novel quadratic correspondence technique to construct genus one Belyi maps from sphere maps, expanding computational tools in algebraic geometry.

## Key findings

- Successfully derived Belyi maps for complex dessins d'enfant
- Demonstrated the method's efficiency with various degrees
- Solved longstanding examples like the suspended pinched point

## Abstract

We present a method of obtaining a Belyi map on an elliptic curve from that on the Riemann sphere. This is done by writing the former as a radical of the latter, which we call a quadratic correspondence, with the radical determining the elliptic curve. With a host of examples of various degrees we demonstrate that the correspondence is an efficient way of obtaining genus one Belyi maps. As applications, we find the Belyi maps for the dessins d'enfant which have arisen as brane-tilings in the physics community, including ones, such as the so-called suspended pinched point, which have been a standing challenge for a number of years.

## Full text

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## Figures

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## References

35 references — full list in the complete paper: https://tomesphere.com/paper/1706.04258/full.md

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Source: https://tomesphere.com/paper/1706.04258