Linear independence in linear systems on elliptic curves

Abstract

Let E be an elliptic curve, with identity O, and let C be a cyclic subgroup of odd order N, over an algebraically closed field k with char k N. For P ∈ C, let sP be a rational function with divisor N · P - N · O. We ask whether the N functions sP are linearly independent. For generic (E,C), we prove that the answer is yes. We bound the number of exceptional (E,C) when N is a prime by using the geometry of the universal generalized elliptic curve over X1(N). The problem can be recast in terms of sections of an arbitrary degree N line bundle on E.