Projective smooth representations in natural characteristic

Abstract

We investigate under which circumstances there exists nonzero projective smooth [G]-modules, where is a field of characteristic p and G is a locally pro-p group. We prove the non-existence of (non-trivial) projective objects for so-called fair groups -- a family including G(F) for a connected reductive group G defined over a non-archimedean local field F. This was proved in SS24 for finite extensions F/Qp. The argument we present in this note has the benefit of being completely elementary and, perhaps more importantly, adaptable to F=Fq(\!(t)\!). Finally, we elucidate the fairness condition via a criterion in the Chabauty space of G.

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