Rank two filtered $(Ï, N)$-modules with Galois descent data and coefficients
arXiv:0711.2137
Abstract
Let $K$ be any finite extension of $Q_{p}$, $L$ any finite Galois extension of $K$ and $E$ any finite large enough coefficient field containing $L$. We classify two-dimensional, F-semistable $E$-representations of $G_{K}$, by listing the isomorphism classes of rank two weakly admissible filtered $(Ï,N,L/K,E)$-modules.
Final version. To appear in Trans. A.M.S