Finite quotients of powers of an elliptic curve

Abstract

Let E be an elliptic curve. When the symmetric group g+1 of order (g+1)! acts on Eg+1 in the natural way, the subgroup E0g+1, consisting of those (g+1)-tuples whose coordinates sum to zero, is stable under the action of g+1. It is isomorphic to Eg. This paper concerns the structure of the quotient variety Eg/ when is a subgroup of g+1 generated by simple transpositions. In an earlier paper we observed that Eg/ is a bundle over a suitable power, EN, with fibers that are products of projective spaces. This paper shows that Eg/ has an \'etale cover by a product of copies of E and projective spaces with an abelian Galois group.