A remark on an integral structure of the imperfect coefficient ring of (φ,Γ)-modules

Abstract

Let K be a complete discrete valuation field of characteristic 0 with perfect residue field of characteristic p>0. Let AK denote the imperfect coefficient ring of (φ,Γ)-modules defined by Jean-Marc Fontaine. We prove that the canonical map W(kK∞)[[μ]]→ AK Ainf is an isomorphism, even when K is ramified. This fact was remarked by Nathalie Wach without proof. In Appendix 2, we include a result of Dylan Pentland. Both results indicate the difficulty of constructing a coefficient ring of ``Wach modules'' in the ramified case.