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Rigid Analytic Vectors in Locally Analytic Representations

Number Theory 2019-08-07 v2

Abstract

Let HH be a uniform pro-pp group. Associated to HH are rigid analytic affinoid groups \bbHn\bbH_n, and their "wide open" subgroups \bbHn\bbH_n^{\circ}. Denote by D\la(H)=C\la(H)bD^\la(H)= C^\la(H)'_b the locally analytic distribution algebra of HH and by \DHnn\DHnn Emerton's ring of \bbHn\bbH_n^{\circ}-rigid analytic distributions on HH. If VV is an admissible locally analytic representation of HH, and if V\bbHn\anV_{\bbH_n^\circ-\an} denotes the subspace of \bbHn\bbH_n^\circ-rigid analytic vectors (with its intrinsic topology), then we show that the continuous dual of V\bbHn\anV_{\bbH_n^\circ-\an} is canonically isomorphic to \DHnn\otD\la(H)V\DHnn \ot_{D^\la(H)} V'. From this we deduce the exactness of the functor VV\bbHn\anV \rightsquigarrow V_{\bbH_n^\circ-\an} on the category of admissible locally analytic representations of HH.

Cite

@article{arxiv.1907.12220,
  title  = {Rigid Analytic Vectors in Locally Analytic Representations},
  author = {Aranya Lahiri},
  journal= {arXiv preprint arXiv:1907.12220},
  year   = {2019}
}

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R2 v1 2026-06-23T10:33:23.856Z