Amit Hogadi, Supriya Pisolkar
Published 2012-10-15Version 1
Let $L/K$ be a finite Galois extension of complete discrete valued fields of characteristic $p$. Assume that the induced residue field extension $k_L/k_K$ is separable. For an integer $n\geq 0$, let $W_n(\sO_L)$ denote the ring of Witt vectors of length $n$ with coefficients in $\sO_L$. We show that the proabelian group ${H^1(G,W_n(\sO_L))}_{n\in \N}$ is zero. This is an equicharacteristic analogue of Hesselholt's conjecture.
Comments: To appear in Acta Airthmetica
On cohomology of Witt vectors of algebraic integers and a conjecture of Hesselholt
An Alternative Proof of Hesselholt's Conjecture on Galois Cohomology of Witt Vectors of Algebraic Integers
$q$-Witt vectors and $q$-Hodge complexes
![QR code for arXiv:1210.3997 [math.NT]](http://oss.arxitics.com/images/favicon.svg)