# An algebraic construction of a solution to the mean field equations on   hyperelliptic Curves and its diabatic limit

**Authors:** Jia-Ming Liou, Chih-Chun Liu

arXiv: 1705.08791 · 2017-07-04

## TL;DR

This paper presents an algebraic method to solve a mean field equation on hyperelliptic curves of genus at least 2, and investigates the behavior of the rescaled equation as the parameter approaches zero.

## Contribution

It introduces an algebraic construction for solutions to the mean field equation on hyperelliptic curves and analyzes the adiabatic limit of the rescaled equation.

## Key findings

- Explicit algebraic solutions on hyperelliptic curves
- Analysis of the adiabatic limit at gamma=0
- Insights into the behavior of solutions under rescaling

## Abstract

In this paper, we give an algebraic construction of the solution to the following mean field equation $$ \Delta \psi+e^{\psi}=4\pi\sum_{i=1}^{2g+2}\delta_{P_{i}}, $$ on a genus $g\geq 2$ hyperelliptic curve $(X,ds^{2})$ where $ds^{2}$ is a canonical metric on $X$ and $\{P_{1},\cdots,P_{2g+2}\}$ is the set of Weierstrass points on $X.$ Furthermore, we study the rescaled equation $$ \Delta \psi+\gamma e^{\psi}=4\pi\gamma \sum_{i=1}^{2g+2}\delta_{P_{i}} $$ and its adiabatic limit at $\gamma=0$.

## Full text

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## References

5 references — full list in the complete paper: https://tomesphere.com/paper/1705.08791/full.md

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Source: https://tomesphere.com/paper/1705.08791