Root numbers of a family of elliptic curves and two applications

Abstract

For each t∈Q\-1,0,1\, define an elliptic curve over Q by align* Et:y2=x(x+1)(x+t2). align* Using a formula for the root number W(Et) as a function of t and assuming some standard conjectures about ranks of elliptic curves, we determine (up to a set of density zero) the set of isomorphism classes of elliptic curves E/Q whose Mordell-Weil group contains Z× Z/2Z× Z/4Z, and the set of rational numbers that can be written as a product of the slopes of two rational right triangles.