Large p-groups of automorphisms of algebraic curves in characteristic p

Abstract

Let S be a p-subgroup of the K-automorphism group Aut( X) of an algebraic curve X of genus g 2 and p-rank γ defined over an algebraically closed field K of characteristic p≥ 3. Nakajima proved that if γ 2 then |S|≤ pp-2(g-1). If equality holds, X is a Nakajima extremal curve. We prove that if |S|>p2p2-p-1(g-1) then one of the following cases occurs: (i) γ=0 and the extension K( X)| K( X)S completely ramifies at a unique place, and does not ramify elsewhere. (ii) |S|=p, and X is an ordinary curve of genus g=p-1. (iii) X is an ordinary, Nakajima extremal curve, and K( X) is an unramified Galois extension of a function field of a curve given in (ii). There are exactly p-1 such Galois extensions. Moreover, if some of them is an abelian extension then S has maximal nilpotency class. The full K-automorphism group of any Nakajima extremal curve is determined, and several infinite families of Nakajima extremal curves are constructed by using their pro-p fundamental groups.