The Green's Function on Rhombic Flat Tori
Numerical Analysis
2025-09-17 v1 Numerical Analysis
Abstract
We obtain the Green's function for any flat rhombic torus , always with numerical values of significant digits up to the fourth decimal place (noting that is unique for and ). This precision is guaranteed by the strategies we adopt, which include theorems such as the Legendre Relation, properties of the Weierstra\ss\,P-Function, and also the algorithmic control of numerical errors. Our code uses complex integration routines developed by H. Karcher, who also introduced the symmetric P-Weierstra\ss\,function, and these resources simplify the computation of elliptic functions considerably.
Cite
@article{arxiv.2509.12299,
title = {The Green's Function on Rhombic Flat Tori},
author = {A. E. D. Castillo and G. A. Lobos and V. Ramos Batista},
journal= {arXiv preprint arXiv:2509.12299},
year = {2025}
}