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References
Arthur, J.: Unipotent automorphic representations: conjectures. In: Orbites unipotentes et représentations II. Groupes p-adiques et réels. Astérisque 171–172, 13–71 (1989)
Arthur, J.: Unipotent automorphic representations: Global motivation. In: Automorphic forms, Shimura varieties, and L-functions (ed. L. Clozel, J.S. Milne), Perspectives in Maths. vol. 10, pp. 1–77. Boston 1990
Ash, A., Stevens, G.: Cohomology of arithmetic groups and congruences between systems of Hecke eigenvalues. J. f. d. Reine u. Angew. Math. 356, 192–220 (1986)
Ash, A., Stevens, G.: Modular forms in characteristic l and special values of their L-functions. Duke Math. J. 53, 849–868 (1986)
Automorphic forms, Shimura varieties and L-functions (ed. L. Clozel, J.S. Milne), Perspectives in Maths. vols 10, 11. Boston 1990
Barrat, P.: Sur le dimension de la cohomologie parabolique de sous-groupes arithmétiques de SL(3), these 3e cycle. Université Pierre et Marie Curie Paris 1987
Borel, A.: Cohomology of arithmetic groups. In: Proc. Int. Congress Math. Vancouver, vol. I, 435–442, Vancouver 1974
Borel, A.: Cohomology and spectrum of an arithmetic group. In: Operator algebras and group representations I, Monographs and Studies in Maths. Vol. 17, pp. 28–45. London 1984
Borel, A.: Regularization theorems in Lie algebra cohomology. Applications. Duke Math. J. 50, 605–623 (1983)
Borel, A.: A decomposition theorem for functions of uniform moderate growth on Γ∖G, manuscript 1983
Borel, A.: Stable real cohomology of arithmetic groups II. In: Manifolds and Lie groups (J. Hano et al. ed.) Progress in Maths. vol. 14, pp. 21–55. Boston 1981
Borel, A., Casselman, W.: L 2-cohomology of locally symmetric manifolds of finite volume. Duke Math. J. 50, 625–647 (1983).
Borel, A., Garland, H.: Laplacian and the discrete spectrum of an arithmetic group. American J. of Maths. 105, 309–335 (1983)
Borel, A., Jacquet, H.: Automorphic forms and automorphic representations. In: Automorphic forms, representations and L-functions, Proc. Symp. Pure Maths., Vol. 33 I, pp. 189–202. Providence 1979
Borel, A., Serre, J-P.: Corners and arithmetic groups, Comment. Math. Helvetici 48, 436–491 (1973)
Borel, A., Wallach, N.: Continuous cohomology, discrete subgroups and representations of reductive groups. Ann. Math. Studies 94, Princeton 1980
Brylinski, J.-L., Labesse, J.-P.: Cohomologie d'intersection et fonctions L de certaines variétés de Shimura. Ann. scient. Ec. Norm. Sup. 17, 361–412 (1984)
Casselman, W.: Introduction to the Schwartz space of Γ∖G. Can. J. Math. XL, 285–320 (1989)
Clozel, L.: On limit multiplicities of discrete series representations in spaces of automorphic forms. Invent. Math. 83, 265–284 (1986)
Clozel, L.: On the cuspidal cohomology of arithmetic subgroups of SL(2n) and the first Betti-number of arithmetic 3-manifolds. Duke Math. J. 55, 475–486 (1987)
Clozel, L.: Motifs et formes automorphes: Applications du principe de fonctorialité. In: Automorphic forms, Shimura varieties, and L-functions (ed. L. Clozel, J.S. Milne), Perspectives in Maths. Vol. 10, pp. 77–160, Boston 1990
De George, D., Wallach, N.: Limit formulas for multiplicities in L 2(Γ∖G), Ann. of Maths. I: 107, 133–150 (1978), II: 109, 477–495 (1979)
Haberland, K.: Perioden von Modulformen und Gruppencohomologie, I, II, III. Math. Nachrichten 112, 245–315 (1983), IV, V preprints 1984
Harder, G.: On the cohomology of SL 2(O), In: Lie groups and their representations, Proc. of the summer school on group representations. pp. 139–150, London 1975
Harder, G.: On the cohomology of discrete arithmetically defined groups. In: Proc. of the Int. Colloq. on Discrete Subgroups of Lie Groups and Appl. to Moduli, (Bombay 1973), 129–160, Oxford 1975
Harder, G.: Period integrals of cohomology classes which are represented by Eisenstein series. In: Automorphic forms, representation theory and arithmetic (Bombay Colloq. 1979), pp. 41–115, Berlin-Heidelberg-New York 1981
Harder, G.: Period integrals of Eisenstein cohomology classes and special values of some L-functions. In: Number theory related to Fermat's last theorem (ed. N. Koblitz), Progress in Maths., vol. 26, pp. 103–142, Stuttgart-Basel 1982
Harder, G.: General aspects in the theory of modular symbols, In: Seminaire de theorie des Nombres, Progress in Maths. Vol. 38, pp. 77–88, Boston 1983
Harder, G.: Eisenstein cohomology of arithmetic groups: The case GL 2. Inventiones math. 89, 37–118 (1987)
Harder, G.: Kohomologie arithmetischer Gruppen. Bonn 1987/88
Harder, G.: Eisensteinkohomologie für Gruppen vom Type GU(2, 1), Math. Ann. 278, 563–592 (1987)
Harder, G.: Arithmetische Eigenschaften von Eisensteinklassen, die modulare Konstruktion von gemischten Motiven und Erweiterungen von endlichen Galois-Moduln, preprint 1989.
Harder, G.: Some results on the Eisenstein cohomology of arithmetic subgroups of GL n . These proceedings
Harder, G.: Eisenstein cohomology of arithmetic groups and its applications to number theory. In: Proceed. Int. Congress Math. Kyoto, to appear
Harder, G., Schappacher, N.: Special values of Hecke L-functions and abelian integrals. In: Arbeitstagung Bonn 1986. Lect. Notes in Mathematics. Vol. 1111, 17–49, Berlin-Heidelberg-New York 1985
Harder, G., Schwermer, J.: Cohomology of arithmetic groups and automorphic forms. In preparation
Harish-Chandra,: Automorphic forms on semisimple Lie groups. Lecture Notes in Mathematics. vol. 62. Berlin-Heidelberg-New York 1968
Harris, M.: Automorphic forms and the cohomology of vector bundles on Shimura varieties. In: Automorphic forms, Shimura varieties, and L-functions (ed. L. Clozel, J.S. Milne), Perspectives in Maths. Vol. 11, pp. 41–92, Boston 1990
Hida, H.: Congruences of cusp forms and special values of their zeta functions. Invent. Math. 63, 225–261 (1981)
Kudla, S., Millson, J.: Geodesic cycles and the Weil representation. I. Quotients of hyperbolic space and Siegel modular forms. Compos. Math. 45, 207–271 (1982)
Kudla, S., Millson, J.: The theta correspondence and harmonic forms, I. Math. Ann. 274, 353–378 (1986), II. Math. Ann. 277, 267–314 (1987)
Kudla, S., Millson, J.: Tubes, cohomology with growth conditions and an application to the theta correspondence. Canad. J. Math. XL, 1–37 (1988)
Kudla, S., Millson, J.: Intersection numbers of cycles on locally symmetric spaces and Fourier coefficients of holomorphic modular forms in several complex variables. preprint 1989
Labesse, J.-P., Schwermer, J.: On liftings and cusp cohomology of arithmetic groups. Invent. Math. 83, 383–401 (1986)
Langlands, R.P.: Letter to A. Borel, dated October 25, 1972
Langlands, R.P.: On the functional equations satisfied by Eisenstein series. Lecture Notes in Mathematics. Vol. 544. Berlin-Heidelberg-New York 1976
Langlands, R.P.: Automorphic representations, Shimura varieties and motives. Ein Märchen. In: Automorphic forms, representations and L-functions, Proc. Symp. Pure Maths., Vol. 33, II, pp. 205–246, Providence 1979
Langlands, R.P.: Euler products. New Haven 1971
Langlands, R.P.: On the zeta-function of some simple Shimura varieties. Can. J. Math. 31, 1121–1216 (1979)
Langlands, R.P.: Dimension of spaces of automorphic forms. In: Algebraic groups and discontinuous subgroups. Proc. Symp. Pure Maths., Vol. 9, pp. 253–257. Providence 1966
Lee, R., Schwermer, J.: Cohomology of arithmetic subgroups of SL 3 at infinity. J. Reine Angew. Math. 330, 100–131 (1982)
Lee, R., Schwermer, J.: The Lefschetz number of an involution on the space of harmonic cusp forms of SL 3. Invent. Math. 73, 189–239 (1983)
Lee, R., Schwermer, J.: Geometry and arithmetic cycles attached to SL 3(Z)-I. Topology 25, 159–174 (1986)
Li, J-S.: Non-vanishing theorems for cohomology of certain arithmetic quotients. preprint 1990
Looijenga, E.: L 2-Cohomology of locally symmetric varieties. Compositio Math. 67, 3–20 (1988)
Millson, J.: Cycles and harmonic forms on locally symmetric spaces. Canad. Math. Bull. 28, 3–38 (1985)
Millson, J., Raghunathan, M.S.: Geometric construction of cohomology for arithmetic groups. In: Indian Academy of Sciences (ed.), Geometry and Analysis (Papers dedicated to the memory of Patodi). pp. 103–123. Bangalore 1980
Oda, T.: Hodge structures of Shimura varieties attached to the unit groups of quaternion algebras. In: Galois groups and their representations. Adv. Studies in Pure Maths. Vol. 2, pp. 15–36, Tokyo-Amsterdam: Kinokuniya, Elsevier 1983
Oda, T.: Distinguished cycles and Shimura varieties. In: Automorphic forms of several variables, Progress in Maths. Vol. 4, pp. 298–332. Boston-Basel-Stuttgart: Birkhäuser 1984
Oda, T.: Hodge structures attached to geometric automorphic forms. In: Automorphic forms and number theory. Adv. Studies in Pure Maths. Vol. 7, pp. 223–276. Tokyo-Amsterdam: Kinokuniya Elsevier 1985
Oda, T.: The Riemann-Hodge period relation for Hilbert modular forms of weight 2. These proceedings
Oda, T., Schwermer, J.: Mixed Hodge structures and automorphic forms for Siegel modular varieties of degree two. Math. Ann. 286, 481–509 (1990)
Rohlfs, J.: The Lefschetz number of an involution on the space of classes of positive definite quadratic forms. Comment. Math. helv. 65, 272–296 (1981)
Rohlfs, J.: On the cuspidal cohomology of the Bianchi modular groups. Math. Zeitschrift 188, 253–269 (1985)
Rohlfs, J.: Lefschetz numbers for arithmetic groups: a survey. These proceedings
Rohlfs, J., Speh, B.: On limit multiplicities of representations with cohomology in the cuspidal spectrum. Duke Math. J. 55, 199–211 (1987)
Rohlfs, J., Speh, B.: Representations with cohomology in the discrete spectrum of subgroups of SO(n,1)(Z) and Lefschetz numbers. Ann. scient. Éc. Norm. Sup. 20, 89–136 (1987)
Rohlfs, J., Speh, B.: Automorphic representations and Lefschetz numbers. Ann. sicent. Éc. Norm. Sup. 22, 1–26 (1989)
Saper, L., Stern, M.: L 2-cohomology of arithmetic varieties. Proc. Math. Acad. Sci. USA. 84, 5516–5519 (1987) and Ann. Maths. (to appear)
Savin, G.: Limit multiplicities of cusp forms. Invent. Math. 95, 149–159 (1989)
Schwermer, J.: Kohomologie arithmetisch definierter Gruppen und Eisensteinreihen. Lecture Notes in Mathematics. Vol. 988. Berlin-Heidelberg-New York 1983
Schwermer, J.: Holmorphy of Eisenstein series at special points and cohomology of arithmetic subgroups of SL n (ℚ). Journal f. d. reine u. angew. Math., 364, 193–220 (1986)
Schwermer, J.: On arithmetic quotients of the Siegel upper half space of degree two. Compositio Math. 58, 233–258 (1986)
Sczech, R.: Dedekindsummen mit elliptischen Funktionen. Inventiones math. 76, 523–551 (1984)
Shahidi, F.: On the Ramanujan conjecture and finiteness of poles for certain L-functions. Ann. Maths. 127, 547–584 (1988)
Stevens, G.: The Eisenstein measure and real quadratic fields. In: Théorie des nombres — number theory (ed. J.-M. De Koninek, C. Levesque), pp. 887–927 Berlin-New York 1990
Tong, Y.L.: Some nonzero harmonic forms and their geometric duals. In: Proc. Symp. Pure Maths. Vol. 49, Part 2, pp. 151–164. Providence 1989
Tong, Y.L., Wang, S.P.: Theta functions defined by geodesic cycles in quotients of SU(p,1). Invent. Math. 71, 467–499 (1983)
Tong, Y.L., Wang, S.P.: Correspondence of Hermitian modular forms to cycles associated to SU(p, 2). J. Differential Geom. 18, 163–207 (1983)
Tong, Y.L., Wang, S.P.: Period integrals in noncompact quotients of SU(p, 1). Duke Math. J. 52, 649–688 (1985)
Tong, Y.L., Wang, S.P.: Construction of cohomology of discrete groups. Trans. Amer. Math. Soc. 306, 735–763 (1988)
Tong, Y.L., Wang, S.P.: Some nonzero cohomology of discrete groups. J. Reine Angew. Math. 382, 85–144 (1987)
Tong, Y.L., Wang, S.P.: Geometric realization of discrete series for semisimple symmetric spaces. Invent. Math. 96, 425–458 (1989)
Vogan, D.A. Jr., Zuckerman, G.J.: Unitary Representations with non-zero cohomology. Compositio Math. 53, 51–90 (1984)
Waldspurger, J.-L.: Quelques propriétés arithmétiques de certaines formes automorphes sur GL(2). Compositio Math. 54, 121–171 (1985)
Waldspurger, J.-L.: Sur les valeurs de certaines fonctions L automorphes en leur centre de symetrie. Compositio Math. 54, 173–242 (1985)
Wallach, N.R.: Limit multiplicities in L 2(Γ∖G). These proceedings
Wang, X.D.: Die Eisensteinklasse in H 1(SL 2(Z), M n (Z)) und die Arithmetik spezieller Werte von L-Funktionen. Bonner Math. Schriften 202. Bonn 1989
Weissauer, R.: Differentialformen zu Untergruppen der Siegelschen Modulgruppe zweiten Grades. J. Reine Angew. Math. 391, 100–156 (1988)
Weslemann, U.: Eisensteinkohomologie und Dedekindsummen für GL 2 über imaginärquadratischen Zahlkörpern. J. Reine Angew. Math. 389, 90–121 (1988)
Zucker, S.: L 2-cohomology of Shimura varieties. In: Automorphic forms, Shimura varieties, and L-functions (ed. L. Clozel and J.S. Milne), Perspectives in Maths. Vol. 11, pp. 377–391, Boston 1990
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Schwermer, J. (1990). Cohomology of arithmetic groups, automorphic forms and L-functions. In: Labesse, JP., Schwermer, J. (eds) Cohomology of Arithmetic Groups and Automorphic Forms. Lecture Notes in Mathematics, vol 1447. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0085724
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