The Moduli Space of Twisted Exact Differential Forms on Curves in Positive Characteristic

Abstract

After fixing a pattern m of zeroes and poles, we introduce a Moduli stack ΓMg,nex, m over Fp that parametrizes smooth marked curves together with a non-zero differential form that is the differential of a meromorphic function. Furthermore, we consider the stack Mg,nex, m that parametrizes those divisors on smooth curves that appear as divisors of exact differential forms. By introducing a local-global principle for first order deformations of the objects that we consider, we show smoothness of these stacks and compute their dimension.