Injectivity of the specialization homomorphism of elliptic curves

Abstract

Let E:y2=(x-e1)(x-e2)(x-e3) be a nonconstant elliptic curve over Q(t), where ej∈ Z[t]. We describe a method for finding a specialization t t0∈Q such that the specialization homomorphism is injective. The method can be directly extended to elliptic curves with ej∈ RK[t] where K is a number field and RK is some UFD such that OK⊂ RK⊂ K. Further, we make a simplification of the method for a special case of quadratic twists. The method is applied to obtain exactly the rank and prove that a set of points are free generators of several elliptic curves over Q(t) coming from Me.