Genus 3 hyperelliptic curves with (2, 4, 4)-split Jacobians

Abstract

We study degree 2 and 4 elliptic subcovers of hyperelliptic curves of genus 3 defined over C. The family of genus 3 hyperelliptic curves which have a degree 2 cover to an elliptic curve E and degree 4 covers to elliptic curves E1 and E2 is a 2-dimensional subvariety of the hyperelliptic moduli H3. We determine this subvariety explicitly. For any given moduli point p ∈ H3 we determine explicitly if the corresponding genus 3 curve X belongs or not to such family. When it does, we can determine elliptic subcovers E, E1, and E2 in terms of the absolute invariants t1, …, t6 as in hypmod3. This variety provides a new family of hyperelliptic curves of genus 3 for which the Jacobians completely split. The sublocus of such family when E1 is isomorphic to E2 is a 1-dimensional variety which we determine explicitly. We can also determine X and E starting form the j-invariant of E1.