Infinite Families Of Isogeny-Torsion Graphs

Abstract

Let E be a Q-isogeny class of elliptic curves defined over Q. The isogeny graph associated to E is a graph which has a vertex for each element of E and an edge for each Q-isogeny of prime degree that maps one element of E to another element of E, with the degree recorded as a label of the edge. The isogeny-torsion graph associated to E is the isogeny graph associated to E where, in addition, we label each vertex with the abstract group structure of the torsion subgroup over Q of the corresponding elliptic curve. The main result of the article is a determination of which isogeny-torsion graphs associated to Q-isogeny classes of elliptic curves defined over Q correspond to infinitely many j-invariants.