Formal degree and existence of stable arithmetic lattices of cuspidal representations of p-adic reductive groups.

M.F. Vigneras

Inventiones mathematicae (1989)

  • Volume: 98, Issue: 3, page 549-564
  • ISSN: 0020-9910; 1432-1297/e

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Vigneras, M.F.. "Formal degree and existence of stable arithmetic lattices of cuspidal representations of p-adic reductive groups.." Inventiones mathematicae 98.3 (1989): 549-564. <http://eudml.org/doc/143742>.

@article{Vigneras1989,
author = {Vigneras, M.F.},
journal = {Inventiones mathematicae},
keywords = {connected reductive group; local non-archimedean field; irreducible complex representation; cuspidal representation; formal degree; discrete cocompact torsion free subgroup; G-stable arithmetic lattice},
number = {3},
pages = {549-564},
title = {Formal degree and existence of stable arithmetic lattices of cuspidal representations of p-adic reductive groups.},
url = {http://eudml.org/doc/143742},
volume = {98},
year = {1989},
}

TY - JOUR
AU - Vigneras, M.F.
TI - Formal degree and existence of stable arithmetic lattices of cuspidal representations of p-adic reductive groups.
JO - Inventiones mathematicae
PY - 1989
VL - 98
IS - 3
SP - 549
EP - 564
KW - connected reductive group; local non-archimedean field; irreducible complex representation; cuspidal representation; formal degree; discrete cocompact torsion free subgroup; G-stable arithmetic lattice
UR - http://eudml.org/doc/143742
ER -

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