Computing the Level of a Fiber for Points on Modular Curves

Abstract

The modular curves in the family X1(N) for natural numbers N parametrize elliptic curves over the complex numbers with a distinguished point of order N. The purpose of this paper is to better understand how to calculate the degrees of points on X1(n) for a prime and arbitrary positive integer n. In analogy with the definition of the level of a Galois representation, we construct a new definition: the level of a fiber of a closed point on a modular curve. Using this definition, we prove that, under certain conditions, if the degree of a point on X1(k+1) is as large as possible given the degree of its image on X1(k), then its lifts on X1(n) have degree as large as possible for all n > k. We prove this result using techniques inspired by work of Lang and Trotter which gives a similar result for the image of -adic Galois representations.