References
Arthur, J.: A Trace Formula for Reductive groups I. Duke Math. J.45, 911–954 (1978)
Arthur, J.: A Trace Formula for Reductive groups II. Compos. Math.40, 87–121 (1980)
Arthur, J.: Eisenstein series and the Trace Formula. Proc. Symp. Pure Math.33, 1, 253–276 (1979)
Arthur, J.: The Trace formula in invariant form. Ann. Math.114, 1–74 (1981)
Arthur, J.: A measure on the unipotent variety (Preprint)
Arthur, J.: The local behavior of weighted orbital integrals (In preparation)
Arthur, J.: A theorem on the Schwartz space of a reductive Lie group. Proc. Natl. Acad. Sci. USA72, 4718–19 (1975)
Barbasch, D., Moscovici, H.:L 2-index and the Selberg Trace Formula. J. Funct. Anal.53, 151–201 (1983)
Bernstein, J., Deligne, B., Kazhadan, D.: Trace Palew-Wiener Theorem for Reductivep-adic groups. (Preprint)
Bernstein, I.N., Zelevinski, A.V.: Induced representations of reductivep-adic groups I. Ann. Sci ENS10, 441–472 (1977)
Borel, A.: Regularization theorems in Lie algebra cohomology. Applications. Duke Math. J.50, 605–623 (1983)
Borel, A., Casselman, W.:L 2-cohomology of locally symmetric manifolds of finite volume. Duke Math. J.50, 625–647 (1983)
Borel, A., Jacquet, H.: Automorphic forms and automorphic representations. Proc. Symp. Pure Math.33, 1, 189–202 (1979)
Borel, A., Wallach, N.: Continuous cohomology, discrete subgroups, and representations of reductive groups. Princeton: Princeton University Press 1980
Casselman, W.: Introduction to the theory of admissible representations ofp-adic groups. (Mimeographed notes)
Clozel, L., Delorme, P.: Sur le théorème de Paley-Wiener invariant pour les groupes réductifs réels. C.R.A.S. Paris (To appear)
Clozel, L., Delorme, P.: Pseudo-coefficients et cohomologie des groupes réductifs reels. C.R.A.S. Paris (To appear)
Clozel, L., Labesse, J.-P., Langlands, R.P.: Morning seminar on the Trace Formula (mimeographed notes). I.A.S., Princeton 1983–84
DeGeorge, D.: On a Theorem of Osborne and Warner. J. Funct. Anal.48, 81–94 (1982)
DeGeorge, D., Wallach, N.: Limit formulas for multiplicities inL 2(Γ/G). Ann. Math.107, 133–150 (1978)
Gèrardin, P.: Construction de Séries discrètesp-adiques. Lect. Notes462. Berlin Heidelberg New York: Springer 1975
Harish-Chandra: Harmonic Analysis in Reductivep-adic groups. Proc. Symp. Pure Math.26, 167–192 (1974)
Harish-Chandra: The Plancherel formula for reductivep-adic groups. In: Collected Papers, vol. 4. Berlin-Heidelberg-New York-Tokyo: Springer 1984
Harish-Chandra: Harmonic Analysis on Reductivep-adic Groups. Lect. Notes in Mathematics 162. Berlin Heidelberg New York: Springer 1984
Henniart, G.: La Conjecture de Langlands locale pourGL (3). Mém. Soc. Math. Fr. (To appear)
Kazhdan, D.: Arithmetic varieties and their fields of quasi-definition. Actes Cong. Intern. Math.2, 321–325 (1970)
Kazhdan, D.: On Arithmetic varieties II. Isr. J. Math.44, 139–159 (1983)
Labesse, J.P.: La formule des traces d'Arthur-Selberg. Seminaire Bourbaki, no. 636 (1984–85)
Mischenko, P.: Invariant tempered distributions on the reductive groupGL(n, F p). Thesis, Toronto 1982
Osborne, M.S., Warner, G.: The theory of Eisenstein systems. New York: Academic Press 1981
Rogawski, J.: Representations ofGL(n) and division algebras over ap-adic field. Duke Math. J.50, 161, 196 (1983)
Silberger, A.J.: The Langlands Quotient Theorem forp-adic Groups. Math. Ann.236, 95–104 (1978)
Varadarajan, V.S.: Harmonic Analysis on Real Reductive Groups. Lecture Notes in Mathematics 576. Berlin Heidelberg New York: Springer 1977
Wallach, N.R.: On the Constant term of a square-integrable automorphic form. Proceedings of the Neptun Conference on Operator algebras and Group representations 1980
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Partially supported by NSF Grant MCS-8211506
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Clozel, L. On limit multiplicites of discrete series representations in spaces of automorphic forms. Invent Math 83, 265–284 (1986). https://doi.org/10.1007/BF01388963
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DOI: https://doi.org/10.1007/BF01388963