Hodge classes on certain hyperelliptic prymians

Abstract

Let n=2g+2 be a positive even integer, f(x) a degree n complex polynomial without multiple roots and Cf: y2=f(x) the corresponding genus g hyperelliptic curve over the field of complex numbers. Let a (g-1)-dimensional complex abelian variety P be a Prym variety of Cf that corresponds to a unramified double cover of Cf. Suppose that there exists a subfield K of such that f(x) lies in K[x], is irreducible over K and its Galois group is the full symmetric group. Assuming that g>2, we prove that End(P) is either the ring of integers Z or the direct sum of two copies of Z; in addition, in both cases the Hodge group of P is "as large as possible". In particular, the Hodge conjecture holds true for all self-products of P.