Torsion representations arising from $(\varphi,\hat{G})$-modules
Number Theory
2012-02-10 v1
Abstract
The notion of a -module is defined by Tong Liu in 2010 to classify lattices in semi-stable representations. In this paper, we study torsion -modules, and torsion p-adic representations associated with them, including the case where p=2. First we prove that the category of torsion p-adic representations arising from torsion -modules is an abelian category. Secondly, we construct a maximal (minimal) theory for -modules by using the theory of \'etale -modules, essentially proved by Xavier Caruso, which is an analogue of Fontaine's theory of \'etale -modules. Non-isomorphic two maximal (minimal) objects give non-isomorphic two torsion p-adic representations.
Cite
@article{arxiv.1202.1858,
title = {Torsion representations arising from $(\varphi,\hat{G})$-modules},
author = {Yoshiyasu Ozeki},
journal= {arXiv preprint arXiv:1202.1858},
year = {2012}
}
Comments
arXiv admin note: significant text overlap with arXiv:1105.5477