A proof of the Breuil-Schneider conjecture in the indecomposable case
Abstract
This paper contains a proof of a conjecture of Breuil and Schneider, on the existence of an invariant norm on any locally algebraic representation of (n), with integral central character, whose smooth part is given by a generalized Steinberg representation. In fact, we prove the analogue for any connected reductive group G. This is done by passing to a global setting, using the trace formula for an -anisotropic model of G. The ultimate norm comes from classical p-adic modular forms.
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