Irreducible Canonical Representations in Positive Characteristic

Abstract

For X a curve over a field of positive characteristic, we investigate when the canonical representation of Aut(X) on H0(X, X) is irreducible. Any curve with an irreducible canonical representation must either be superspecial or ordinary. Having a small automorphism group is an obstruction to having irreducible canonical representation; with this motivation, the bulk of the paper is spent bounding the size of automorphism groups of superspecial and ordinary curves. After proving that all automorphisms of an Fq2-maximal curve are defined over Fq2, we find all superspecial curves with g > 82 having an irreducible representation. In the ordinary case, we provide a bound on the size of the automorphism group of an ordinary curve that improves on a result of Nakajima.