Hyperelliptic and trigonal modular curves in characteristic p

Abstract

Let X(N) be an intermediate modular curve of level N, meaning that there exist (possibly trivial) morphisms X1(N)→ X(N) → X0(N). For all such intermediate modular curves, we give an explicit description of all primes p such that X(N) Fp is either hyperelliptic or trigonal. Furthermore we also determine all primes p such that X(N) Fp is trigonal. This is done by first using the Castelnuovo-Severi inequality to establish a bound N0 such that if X0(N) Fp is hyperelliptic or trigonal, then N ≤ N0. To deal with the remaining small values of N, we develop a method based on the careful study of the canonical ideal to determine, for a fixed curve X(N), all the primes p such that the X(N) Fp is trigonal or hyperelliptic. Furthermore, using similar methods, we show that X(N) Fp is not a smooth plane quintic, for any N and any p.