Nurdagül Anbar, Burçin Güneş
Published 2019-12-17Version 1
We study the automorphisms of a function field of genus $g\geq 2$ over an algebraically closed field of characteristic $p>0$. More precisely, we show that the order of a nilpotent subgroup $G$ of its automorphism group is bounded by $16 (g-1)$ when G is not a $p$-group. We show that if $|G|=16(g-1) $, then $g-1$ is a power of $2$. Furthermore, we provide an infinite family of function fields attaining the bound.
The Geometry of the Artin-Schreier-Mumford Curves over an Algebraically Closed Field
The Brauer group of $\mathscr{M}_{1,1}$ over algebraically closed fields of characteristic $2$
Orthogonal bundles over curves in characteristic two
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