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Characters of Non-Connected, Reductive p-Abic Groups

Published online by Cambridge University Press:  20 November 2018

Laurent Clozel*
Affiliation:
University of Michigan, Ann Arbor, Michigan
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In this paper, we extend to non-connected, reductive groups over p-adic field of characteristic zero Harish-Chandra's theorem on the local integrability of characters.

Harish-Chandra's theorem states that the distribution character of an admissible, irreducible representation of a (connected) reductive p-adic group is locally integrable. We show that this extends to any reductive group; just as in the connected case, one even gets a very precise control over the singularities of the character along the singular elements.

As will be seen, the proof in the non-connected case is an easy extension of Harish-Chandra's. The reader may wonder why we have bothered to write its generalization completely. The reason is that the original article [8] does not contain proofs for the crucial lemmas, and this makes it impossible to explain why the theorem extends. Because this result is needed for work of Arthur and the author on base change, it has been thought necessary to give complete arguments.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1987

References

1. Arthur, J. and Clozel, L., Base change for GL(n), in preparation.Google Scholar
2. Borel, A., Linear algebraic groups, (Benjamin, New York-Amsterdam, 1969).Google Scholar
3. Cartier, P., Representations of p-adic groups, in Automorphic forms, representations and L-functions, Proc. Symp. Pure Math. 33 (1979), 111155.Google Scholar
4. Clozel, L., Changement de base pour les représentations tempérées des groupes réductifs réels, Ann. Se. E.N.S. 15 (1982), 45115.Google Scholar
5. Clozel, L., Sur une conjecture de Howe, Compositio Math. 56 (1985), 87110.Google Scholar
6. Clozel, L., Labesse, J.-P. and Langlands, R. P., Morning seminar on the trace formula, notes, I.A.S. (1984).Google Scholar
7. Flicker, Y., Symmetric square: applications of a trace formula, preprint.Google Scholar
8. Harish-Chandra, , Admissible invariant distributions on reductive p-adic groups, Queen's Papers in Pure and Applied Math. 48 (1978), 281347.Google Scholar
9. Harish-Chandra, , Harmonic analysis on reductive p-adic groups, (Springer Lecture Notes, 162 1970).CrossRefGoogle Scholar
10. Howe, R., Kirillov theory for compact p-adic groups, Pacific J. Math. 73 (1977), 365381.Google Scholar
11. Howe, R., On representations of discrete, finitely generated, torsion-free, nilpotent groups, Pacific J. Math. 73 (1977), 281305.Google Scholar
12. Howe, R., Some qualitative results on the representation theory of GLn over a p-adic field., Pacific J. Math. 73 (1977), 479538.Google Scholar
13. Langlands, R. P., Base change for GL(2), Annals of Math. Study 96 (1980).Google Scholar
14. Rodier, F., Intégrabilité locale des caractères du groupe GL(n, k) où k est un corps de nombres de caractéristiques positive, Duke Math. J. 52 (1985), 771792.Google Scholar
15. Steinberg, R., Regular elements of semi-simple algebraic groups, IHES Publ. Math. 25 (1965), 4980.Google Scholar