References
J. Arthur: The local behaviour of weighted orbital integrals. Duke Math. J.56, 223–293 (1988)
J. Arthur. The characters of supercuspidal representations as weighted orbital integrals. Proc. Indian Acad. Sci.97, 3–19 (1988)
M. Assem: The Fourier transform and some character formulae forp-adicSL l ,l a prime. Amer. J. Math.116, 1433–1467 (1994)
H. Carayol: Représentations cuspidales du groupe linéaire. Ann. Scient. Éc. Norm. Sup., 4e série, t.17, 191–225 (1984)
W. Casselman: The Steinberg character as a true character. In Harmonic Analysis on Homogeneous Spaces (Proc. Math. Symp. XXVI pp. 413–417) Providence: Amer. Math. Soc. 1973
L. Corwin, A. Moy, P.J. Sally, Jr.: Degrees and formal degrees for division algebras andGl n over a p-adic field. Pacific J. Math.141, 21–45 (1991)
G. van Dijk: Computation of certain induced characters of p-adic groups. Math. Ann.199, 229–240 (1972)
Harish-Chandra: Harmonic analysis on reductive p-adic groups. (Lecture Notes in Math., vol. 162) Berlin Heidelberg New York: Springer 1970
Harish-Chandra: Admissible distributions on reductive p-adic groups. In: Lie Theories and Their Applications (Queen's Papers in Pure and Applied Mathematics, vol. 48, pp. 281–347) 1978
R. Howe: On the character of Weil's representation. Trans. A.M.S.117, 287–298 (1973)
R. Howe: The Fourier transform and germs of characters (case ofGL n over a p-adic field): Math. Ann.208, 305–322 (1974)
R. Howe: Tamely ramified supercuspidal representations ofGl n . Pacific J. Math.73, 437–460 (1977)
R. Howe: Some qualitative results on the representation theory ofGl n over a p-adic field. Pacific J. Math.73, 479–538 (1977)
D. Jabon: The supercuspidal representations of U(2,1) andGSp 4 over a local field via Hecke algebra isomorphisms. Thesis, University of Chicago 1989
H. Jacquet: Generic representations. In: Lecture Notes in Math. (vol. 587, pp. 91–101) Berlin Heidelberg New York: Springer 1977
D. Kazhdan: Proof of Springer's hypothesis. Israel J. Math.28, 272–286 (1977)
D. Kazhdan: Cuspidal geometry ofp-adic groups. J. Analyse Math.47, 1–36 (1986)
G. Lusztig, N. Spaltenstein: Induced unipotent classes. J. London Math. Soc.19, 41–52 (1979)
C. Mœglin, J.L. Waldspurger: Modèles de Whittaker dégénérés pour des groupes p-adiques. Math. Z.196, 427–452 (1987)
L. Morris: Tamely ramified supercuspidal representations of symplectic groups. Proc. London Math. Soc.63, 519–551 (1991)
L. Morris: Tamely ramified supercuspidal rèpresentations of classical groups I. Filtrations. Ann. Sci. Ec. Norm. Sup.24, 705–738 (1991)
L. Morris: Tamely ramified supercuspidal representations of classical groups II: Representation theory, Ann. Sci. Ec. Norm. Sup.25, 233–274 (1992)
A. Moy: Local constants and the tame Langlands correspondence. Amer. J. Math.108, 863–930 (1986)
A. Moy: Representations ofU(2,1) over a p-adic field. J. für die reine u. angewandte Math.372 178–208 (1986)
A. Moy: Representations ofGSp(4) over a p-adic field: parts 1 and 2. Comp. Math.66, 237–284, 285–328 (1988)
A. Moy, P.J. Sally, Jr.: Supercuspidal representations ofSL n over a p-adic field: the tame case. Duke Math. J.51, 149–161 (1984)
F. Murnaghan: Asymptotic behaviour of supercuspidal characters of p-adicGL 3 andGL 4: the generic unramified case. Pacific J. Math.148, 107–130 (1991)
F. Murnaghan: Asymptotic behaviour of supercuspidal characters of p-adicGSp 4. Comp. Math.80, 15–54 (1991)
F. Murnaghan: Local character expansions for supercuspidal representations of U(3). Canadian J. Math., to appear
F. Murnaghan: Characters of supercuspidal representations ofSL n . Pacific J. Math., to appear
F. Murnaghan: Characters of supercuspidal representations of classical groups. Ann. scient. Ec. Norm. Sup., to appear
J. Repka: Shalika's germs for p-adicGL(n), II: the subregular term. Pacific J. Math.113, 173–182 (1984)
W. Rossmann: Kirillov's character formula for reductive Lie groups. Invent. Math.48, 207–220 (1978)
M. Vergne: On Rossmann's character formula, for discrete series. Invent. Math.54, 11–14 (1979)
J.-L. Waldspurger: Sur les germes de Shalika pour les groupes linéaires, Math. Ann.284, 199–221 (1989)
J.-L. Waldspurger: Sur les intégrales orbitales tordues pour les groupes linéaires: un lemme fondamental. Can. J. Math.43, 852–896 (1991)
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Research supported in part by NSERC