Torsion points on hyperelliptic Jacobians via Anderson's p-adic soliton theory

Abstract

We show that torsion points of certain orders are not on a theta divisor in the Jacobian variety of a hyperelliptic curve given by the equation y2=x2g+1+x with g ≥ 2. The proof employs a method of Anderson who proved an analogous result for a cyclic quotient of a Fermat curve of prime degree.