Odd degree isolated points on X1(N) with rational j-invariant

Abstract

Let C be a curve defined over a number field k. We say a closed point x∈ C of degree d is isolated if it does not belong to an infinite family of degree d points parametrized by the projective line or a positive rank abelian subvariety of the curve's Jacobian. Building on work of Bourdon, Ejder, Liu, Odumodu, and Viray, we characterize elliptic curves with rational j-invariant which give rise to an isolated point of odd degree on X1(N)/Q for some positive integer N.