Genus two curves covering elliptic curves: a computational approach

Abstract

A genus 2 curve C has an elliptic subcover if there exists a degree n maximal covering : C E to an elliptic curve E. Degree n elliptic subcovers occur in pairs (E, E'). The Jacobian JC of C is isogenous of degree n2 to the product E × E'. We say that JC is (n, n)-split. The locus of C, denoted by n, is an algebraic subvariety of the moduli space 2. The space 2 was studied in Shaska/V\"olklein and Gaudry/Schost. The space 3 was studied in Shaska (2004) were an algebraic description was given as sublocus of 2. In this survey we give a brief description of the spaces n for a general n and then focus on small n. We describe some of the computational details which were skipped in Shaska/V\"olklein and Shaska (2004). Further we explicitly describe the relation between the elliptic subcovers E and E'. We have implemented most of these relations in computer programs which check easily whether a genus 2 curve has (2, 2) or (3, 3) split Jacobian. In each case the elliptic subcovers can be explicitly computed.