English

Resolutions for Locally Analytic Representations

Representation Theory 2024-09-10 v1 Number Theory

Abstract

The purpose of this paper is to study resolutions of locally analytic representations of a pp-adic reductive group GG. Given a locally analytic representation VV of GG, we modify the Schneider-Stuhler complex (originally defined for smooth representations) so as to give an `analytic' variant SA(V){\mathcal S}^A_\bullet(V). The representations in this complex are built out of spaces of analytic vectors Aσ(V)A_\sigma(V) for compact open subgroups UσU_\sigma, indexed by facets σ\sigma of the Bruhat-Tits building of GG. These analytic representations (of compact open subgroups of GG) are then resolved using the Chevalley-Eilenberg complex from the theory of Lie algebras. This gives rise to a resolution Sq,CE(V)SqA(V){\mathcal S}^{\rm CE}_{q,\bullet}(V) \rightarrow {\mathcal S}^A_q(V) for each representation SqA(V){\mathcal S}^A_q(V) in the analytic Schneider-Stuhler complex. In a last step we show that the family of representations Sq,jCE(V){\mathcal S}^{\rm CE}_{q,j}(V) can be given the structure of a Wall complex. The associated total complex SCE(V){\mathcal S}^{\rm CE}_\bullet(V) has then the same homology as that of SA(V){\mathcal S}^A_\bullet(V). If the latter is a resolution of VV, then one can use SCE(V){\mathcal S}^{\rm CE}_\bullet(V) to find a complex which computes the extension group ExtGn(V,W)\underline{Ext}^n_G(V,W), provided VV and WW satisfy certain conditions which are satisfied when both are admissible locally analytic representations.

Keywords

Cite

@article{arxiv.2409.05079,
  title  = {Resolutions for Locally Analytic Representations},
  author = {Shishir Agrawal and Matthias Strauch},
  journal= {arXiv preprint arXiv:2409.05079},
  year   = {2024}
}
R2 v1 2026-06-28T18:37:42.887Z