Algebraic curves with many automorphisms

Abstract

Let X be a (projective, geometrically irreducible, nonsingular) algebraic curve of genus g 2 defined over an algebraically closed field K of odd characteristic p. Let Aut(X) be the group of all automorphisms of X which fix K element-wise. It is known that if |Aut(X)|≥ 8g3 then the p-rank (equivalently, the Hasse-Witt invariant) of X is zero. This raises the problem of determining the (minimum-value) function f(g) such that whenever |Aut(X)|≥ f(g) then X has zero p-rank. For even g we prove that f(g)≤ 900 g2. The odd genus case appears to be much more difficult although, for any genus g≥ 2, if Aut(X) has a solvable subgroup G such that |G|>252 g2 then X has zero p-rank and G fixes a point of X. Our proofs use the Hurwitz genus formula and the Deuring Shafarevich formula together with a few deep results from finite group theory characterizing finite simple groups whose Sylow 2-subgroups have a cyclic subgroup of index 2. We also point out some connections with the Abhyankar conjecture and the Katz-Gabber covers.