Mean field equations, hyperelliptic curves and modular forms: II
Abstract
A pre-modular form of weight is introduced for each , where , such that for , every non-trivial zero of , namely , corresponds to a (scaling family of) solution to the mean field equation \begin{equation} \tag{MFE} \triangle u + e^u = \rho \, \delta_0 \end{equation} on the flat torus with singular strength . In Part I (Cambridge J. Math. 3, 2015), a hyperelliptic curve , the Lam\'e curve, associated to the MFE was constructed. Our construction of relies on a detailed study on the correspondence induced from the hyperelliptic projection and the addition map. As an application of the explicit form of the weight 10 pre-modular form , a counting formula for Lam\'e equations of degree with finite monodromy is given in the appendix (by Y.-C. Chou).
Keywords
Cite
@article{arxiv.1502.03295,
title = {Mean field equations, hyperelliptic curves and modular forms: II},
author = {Chang-Shou Lin and Chin-Lung Wang},
journal= {arXiv preprint arXiv:1502.03295},
year = {2016}
}
Comments
32 pages. Part of content in previous versions is removed and published separately. One author is removed