Non-isogenous elliptic curves and hyperelliptic jacobians II

Abstract

Let K be a field of characteristic different from 2, K its algebraic closure. Let n 3 be an odd integer. Let f(x) and h(x) be degree n polynomials with coefficients in K and without repeated roots. Let us consider genus (n-1)/2 hyperelliptic curves Cf: y2=f(x) and Ch: y2=h(x), and their jacobians J(Cf) and J(Ch), which are (n-1)/2-dimensional abelian varieties defined over K. Suppose that one of the polynomials is irreducible and the other splits completely over K. We prove that if J(Cf) and J(Ch) are isogenous over K then there is an (odd) prime dividing n such that the endomorphism algebras of both J(Cf) and J(Ch) contain a subfield that is isomorphic to the field of roots of 1.