Induced representations and classification for $GSp\left(2,F\right)$ and $Sp\left(2,F\right)$
Paires duales réductives en caractéristiques 2. Induced representations and classifications for $GSp\left(2,F\right)$ and $Sp\left(2,F\right)$, Mémoires de la Société Mathématique de France, Série 2, no. 52 (1993), pp. 75-133.
@incollection{MSMF_1993_2_52__75_0,
author = {Sally, Paul J. junior and Tadi\'c, Marko},
title = {Induced representations and classification for $GSp(2,F)$ and $Sp(2,F)$},
booktitle = {Paires duales r\'eductives en caract\'eristiques 2. Induced representations and classifications for $GSp (2,F)$ and $Sp (2,F)$},
author = {Collectif},
series = {M\'emoires de la Soci\'et\'e Math\'ematique de France},
pages = {75--133},
publisher = {Soci\'et\'e math\'ematique de France},
number = {52},
year = {1993},
doi = {10.24033/msmf.366},
zbl = {0784.22008},
mrnumber = {94e:22030},
url = {archive.numdam.org/item/MSMF_1993_2_52__75_0/}
}
Sally, Paul J.jun.; Tadic, Marko. Induced representations and classification for $GSp(2,F)$ and $Sp(2,F)$, dans Paires duales réductives en caractéristiques 2. Induced representations and classifications for $GSp (2,F)$ and $Sp (2,F)$, Mémoires de la Société Mathématique de France, Série 2, no. 52 (1993), pp. 75-133. doi : 10.24033/msmf.366. http://archive.numdam.org/item/MSMF_1993_2_52__75_0/

[BZ] Bernstein, J. and Zelevinsky, A.V., Induced representations of reductive p-adic groups I, Ann. Sci. École Norm Sup. 10 (1977), 441-472. | Numdam | MR 58 #28310 | Zbl 0412.22015

[BWh] Borel, A. and Wallach, N., Continuous cohomology, discrete subgroups, and representations of reductive groups, Princeton University Press, Princeton, (1980). | MR 83c:22018 | Zbl 0443.22010

[C] Casselman, W., Introduction to the theory of admissible representations of p-adic reductive groups, preprint.

[GeKn] Gelbart, S.S. and Knapp, A. W., L-indistinguishability and R groups for the special linear group, Advan. in Math., 43 (1982), 101-121. | MR 83j:22009 | Zbl 0493.22005

[Gu] Gustafson, R., The degenerate principal series for Sp(2n), Mem. of the Amer. Math. Society, 248 (1981), 1-81. | MR 83e:22021 | Zbl 0482.22013

[HMr] Howe, R. and Moore, C.C., Asymptotic properties of unitary representations, J. Functional Analysis, 32, No. 1 (1979), 72-96. | MR 80g:22017 | Zbl 0404.22015

[J] Jantzen, C., Degenerate principal series for symplectic groups, to appear in Mem. of the Amer. Math. Society. | Zbl 0814.22004

[Ke] Keys, D., On the decomposition of reducible principal series representations of p-adic Chevalley groups, Pacific J. Math, 101 (1982), 351-388. | MR 84d:22032 | Zbl 0438.22010

[Mi] Milici, D., On C*-algebras with bounded trace, Glasnik Mat., 8(28) (1973), 7-21. | MR 48 #2781 | Zbl 0265.46072

[Mo] Moy, A., Representations of GSp(4) over a p-adic field : parts 1 and 2, Compositio Math., 66 (1988), 237-328. | Numdam | MR 90d:22022 | Zbl 0662.22012

[R1] Rodier, F., Décomposition de la série principale des groupes réductifs p-adiques, Non-Commutative Harmonic Analysis, Lecture Notes in Math. 880, Springer-Verlag, Berlin (1981). | MR 83i:22029 | Zbl 0465.22009

[R2] Rodier, F. Sur les représentations non ramifiées des groupes réductifs p-adiques ; l'example de GSp(4), Bull. Soc. Math. France, 116 (1988), 15-42. | Numdam | MR 89i:22033 | Zbl 0662.22011

[S1] Shahidi, F., A proof of Langlands conjecture on Plancherel measures ; complementary series for p-adic groups, Ann. of Math., 132 (1990), 273-330. | MR 91m:11095 | Zbl 0780.22005

[S2] Shahidi, F., Langlands' conjecture on Plancherel measures of p-adic groups, preprint.

[S3] Shahidi, F., L-functions and representation theory of p-adic, preprint.

[S4] Shahidi, F., Letter.

[T1] Tadić, M., Classification of unitary representations in irreducible representations of general linear group (non-archimedean case), Ann. Sci. École Norm. Sup, 19 (1986), 335-382. | Numdam | MR 88b:22021 | Zbl 0614.22005

[T2] Tadić, M. Induced representations of GL(n, A) for p-adic division algebras A, J. reine angew. Math., 405 (1990), 48-77. | MR 91i:22025 | Zbl 0684.22008

[T3] Tadić, M., Notes on representations of non-archimedean SL(n), Pacific J. Math. (to appear).