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On holomorphic polydifferentials in positive characteristic

✍ Scribed by Sotiris Karanikolopoulos

Publisher
John Wiley and Sons
Year
2012
Tongue
English
Weight
309 KB
Volume
285
Category
Article
ISSN
0025-584X

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✦ Synopsis

Abstract

Let F/E be an abelian Galois extension of function fields over an algebraic closed field K of characteristic p > 0. Denote by G the Galois group of the extension F/E. In this paper, we study Ξ©(m), the space of holomorphic m‐(poly)differentials of the function field of F when G is cyclic or a certain elementary abelian group of order p^n^; we give bases for each case when the base field is rational, introduce the Boseck invariants and give an elementary approach to the G module structure of Ξ©(m) in terms of Boseck invariants. The last computation is achieved without any restriction on the base field in the cyclic case, while in the elementary abelian case it is assumed that the base field is rational. Finally, an application to the computation of the tangent space of the deformation functor of curves with automorphisms is given.

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Superrigidity Theorems in Positive Chara
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✍ Lucy Lifschitz πŸ“‚ Article πŸ“… 2000 πŸ› Elsevier Science 🌐 English βš– 233 KB

Berlin to the case of the more general non-reductive target group F. We also provide a proof of the cocycle superrigidity theorem in the case of algebraic groups defined over a local field of positive characteristic and the generalization of this proof to the case of the more general target group an