Morphisms on the modular curve X0(p) and degree 6 points

Abstract

Let p be a prime. We study non-constant morphisms f:X0(p) Y, where Y/ Q is a curve of genus ≥ 2. We prove that for p<3000 such an f of degree d>1 must be isomorphic to the quotient map X0(p) X0+(p). Supported by computational and theoretical evidence, we also conjecture that this is true for all primes p. These results allow us to classify all points of degree ≤ 25 on X0(p) that come from a map to some curve of genus ≥ 2. As an application, we were able to determine all curves X0(p) with infinitely many points of degree 6 over Q except for p=193, continuing the previous results on small degree points on X0(N).