Non-hyperelliptic modular curves of genus 3

Abstract

A curve C defined over Q is modular of level N if there exists a non-constant morphism from X1(N) onto C defined over Q for some positive integer N. We provide a sufficient and necessary condition for the existence of a modular non-hyperelliptic curve C of genus 3 and level N such that Jac(C) is Q-isogenous to a given three dimensional Q-quotient of J1 (N). Using this criterion, we present an algorithm to compute explicitly equations for modular non-hyperelliptic curves of genus 3. Let C be a modular curve of level N, we say that C is new if the corresponding morphism between J1(N) and Jac(C) factors through the new part of J1(N).