Biquadratic addition laws on elliptic curves in P3 and the canonical map of the (1,2,2)-Theta divisor

Abstract

We recall that a smooth ample surface S in a general (1,2,2)-polarized abelian threefold, which is the pullback of the Theta divisor of a smooth plane quartic curve D, is a surface isogenous to the product C × C, where C is a genus 9 curve embedded in P3 as complete intersection of a smooth quadric and a smooth quartic. We show that the space of global holomorhic sections of the canonical bundle of this surface is generated by certain determinantal bihomogeneous polynomials of bidegree (2,2) on P3, which can be used to define biquadratic addition laws on the Jacobi model of elliptic curves, embedded in P3 as complete intersection of two quadrics. Finally, we use this interesting relationship with the biquadratic addition laws to describe the behavior of the canonical map of S.