On towers of Isogeny graphs with full level structure

Abstract

Let p,q,l be three distinct prime numbers and let N be a positive integer coprime to pql. For an integer n 0, we define the directed graph Xlq(pnN) whose vertices are given by isomorphism classes of elliptic curves over a finite field of characteristic q equipped with a level pnN structure. The edges of Xlq(pnN) are given by l-isogenies. We are interested in when the connected components of Xlq(pnN) give rise to a tower of Galois covers as n varies. We show that only in the supersingular case we do get a tower of Galois covers. We also study similar towers of isogeny graphs given by oriented supersingular curves, as introduced by Col\`o-Kohel, enhanced with a level structure.