Isolated j-invariants arising from the modular curve X0(n)

Abstract

An isolated point of degree d is a closed point on an algebraic curve which does not belong to an infinite family of degree d points that can be parameterized by some geometric object. We provide an algorithm to test whether a rational, non-CM j-invariant gives rise to an isolated point on the modular curve X0(n), for any n ∈ Z+, using key results from Menendez and Zywina. This work is inspired by the prior algorithm of Bourdon et al. which tests whether a rational, non-CM j-invariant gives rise to an isolated point on any modular curve X1(n). From the implementation of our algorithm, we determine that the set of j-invariants corresponding to isolated points on X1(n) is neither a subset nor a superset of those corresponding to isolated points on X0(n).