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 ConfnCmC between unordered configuration spaces, where m∈\3,4\, are the resolving quartic map R4C3C, a map 33C4C constructed from the inflection points of elliptic curves in a family, and 3 R. This completes the classification of holomorphic maps ConfnCmC for m≤ n, extending results of Lin, Chen and Salter, and partially resolves a conjecture of Farb. We also classify the holomorphic families of elliptic curves over ConfnC. To do this we classify homomorphisms between braid groups with few strands and PSL2Z, 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.