Ordinary algebraic curves with many automorphisms in positive characteristic

Abstract

Let X be an ordinary (projective, geometrically irreducible, nonsingular) algebraic curve of genus g(X) 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. For any solvable subgroup G of Aut(X) we prove that |G|≤ 34 (g(X)+1)3/2. There are known curves attaining this bound up to the constant 34. For p odd, our result improves the classical Nakajima bound |G|≤ 84(g(X)-1)g(X), and, for solvable groups G, the Gunby-Smith-Yuan bound |G|≤ 6(g(X)2+1221g(X)3/2) where g(X)>cp2 for some positive constant c.