English

Integral structures in the $p$-adic holomorphic discrete series

Representation Theory 2014-08-15 v1 Algebraic Geometry Number Theory

Abstract

For a local non-Archimedean field KK we construct GLd+1(K){\rm GL}_{d+1}(K)-equivariant coherent sheaves VOK{\mathcal V}_{{\mathcal O}_K} on the formal OK{\mathcal O}_K-scheme X{\mathfrak X} underlying the symmetric space XX over KK of dimension dd. These VOK{\mathcal V}_{{\mathcal O}_K} are OK{\mathcal O}_K-lattices in (the sheaf version of) the holomorphic discrete series representations (in KK-vector spaces) of GLd+1(K){\rm GL}_{d+1}(K) as defined by P. Schneider \cite{schn}. We prove that the cohomology Ht(X,VOK)H^t({\mathfrak X},{\mathcal V}_{{\mathcal O}_K}) vanishes for t>0t>0, for VOK{\mathcal V}_{{\mathcal O}_K} in a certain subclass. The proof is related to the other main topic of this paper: over a finite field kk, the study of the cohomology of vector bundles on the natural normal crossings compactification YY of the Deligne-Lusztig variety Y0Y^0 for GLd+1/k{\rm GL}_{d+1}/k (so Y0Y^0 is the open subscheme of Pkd{\mathbb P}_k^d obtained by deleting all its kk-rational hyperplanes).

Keywords

Cite

@article{arxiv.1408.3350,
  title  = {Integral structures in the $p$-adic holomorphic discrete series},
  author = {Elmar Grosse-Klönne},
  journal= {arXiv preprint arXiv:1408.3350},
  year   = {2014}
}
R2 v1 2026-06-22T05:29:14.206Z