The weighted moduli spaces of sextics

Abstract

We use the weighted moduli height as defined in sh-h to investigate the distribution of fine moduli points in the moduli space of genus two curves. We show that for any genus two curve with equation y2=f(x), its weighted moduli height h (p) ≤ 23 3 · 5 · 7 \, · H(f), where H(f) is the minimal naive height of the curve as defined in height. Based on the weighted moduli height h we create a database of genus two curves defined over Q with small h and show that for small such height ( h < 5) about 30% of points are fine moduli points.