The Abel-Jacobi map of the space of conics for double sextic threefolds

Abstract

Let X be a double cover of P3 branched along a sextic surface Y. In this paper, we show that, for general X, the Abel-Jacobi map associated to the normalization F(X) of the surface F(X) of curves contained in X which are preimages of lines bitangent to Y, gives an isogeny between the Albanese variety of F(X) and the intermediate Jacobian of X.