Maximal stable lattices in representations over discretely valued fields

Abstract

Let G GLn(K) be an continuous irreducible representation of a compact group over a complete discretely valued field K. Let Wi,Wj be two irreducible subrepresentations of ss, the semisimplification of the residual representation. We study the structure of the G-stable lattices ⊂eq Kn with a view to understanding the question of when realises a non-split extension of Wi by Wj. In particular, we introduce the notion of a maximal G-stable lattice and prove that any non-split extension of Wi by Wj that can be realised by can also be realised by a maximal lattice. As applications, we give a new proof and a strengthening of Bella\"iche's generalisation of Ribet's Lemma, which assures the abundancy of non-split extensions that can be realised by . On the other hand, we also show that, if the representations Wi, Wj occur with multiplicity one in ss, then can realise at most one non-split extension of Wi by Wj.