A Constructive Proof of Masser's Theorem

Abstract

The Modified Szpiro Conjecture, equivalent to the abc Conjecture, states that for each ε>0, there are finitely many rational elliptic curves satisfying NE6+ε<\!\ c43,c62\ where c4 and c6 are the invariants associated to a minimal model of E and NE is the conductor of E. We say E is a good elliptic curve if NE6<\!\ c43,c62\ . Masser showed that there are infinitely many good Frey curves. Here we give a constructive proof of this assertion.