Braid groups, elliptic curves, and resolving the quartic
Abstract
We show that, up to a natural equivalence relation, the only non-trivial, non-identity holomorphic maps between unordered configuration spaces, where , are the resolving quartic map , a map constructed from the inflection points of elliptic curves in a family, and . This completes the classification of holomorphic maps for , extending results of Lin, Chen and Salter, and partially resolves a conjecture of Farb. We also classify the holomorphic families of elliptic curves over . To do this we classify homomorphisms between braid groups with few strands and , then apply powerful results from complex analysis and Teichm\"uller theory. Furthermore, we prove a conjecture of Castel about the equivalence classes of endomorphisms of the braid group with three strands.
Cite
@article{arxiv.2309.12999,
title = {Braid groups, elliptic curves, and resolving the quartic},
author = {Peter Huxford and Jeroen Schillewaert},
journal= {arXiv preprint arXiv:2309.12999},
year = {2023}
}
Comments
28 pages, 5 figures