References
Auslander, L., Green, L.:G-induced flows. Amer. J. Math.88, 43–60 (1966)
Borel, A.: Linear Algebraic Groups. New York: Benjamin 1969
Brezin, J., Moore, C.C.: Flows on homogeneous spaces: a new look. Preprint
Dani, S.G.: Spectrum of an affine transformation. Duke Math. J.44, 129–155 (1977)
Howe, R., Moore, C.C.: Asymptotic behavior of unitary representations. To appear in J. Fenl. Anal.
Iwasawa, K.: On some types of topological groups. Ann. of Math. (2)50, 507–558 (1949)
Iwasawa, K.: Topological groups with invariant compact neighborhoods of the identity. Ann. of Math. (2)54, 345–348 (1951)
Mackey, G.W.: Induced representations of locally compact groups I. Ann. of Math.55, 101–139 (1952)
Mackey, G.W.: Unitary representations of group extensions I. Acta. Math.99, 265–311 (1958)
Mackey, G.W.: The theory of unitary representations. Chicago: The Univ. of Chicago Press 1976
Mautner, F.J.: Geodesic flows on symmetric Riemannian spaces. Ann. of Math.65, 416–431 (1957)
Moore, C.C.: Ergodicity of flows on homogeneous space. Amer. J. Math.88, 154–178 (1966)
Moore, C.C.: The Mautner Phenomenon for general unitary representations. Preprint
Wang, S.P.: On isolated points in the dual spaces of locally compact groups. Math. Ann.218, 19–34 (1975)
Wang, S.P.: On Mautner phenomenon and groups with property (T). Amer. J. of Math.104, 1191–1210 (1982)
Author information
Authors and Affiliations
Additional information
Supported partially by NSF Grant No. 79-00695
Rights and permissions
About this article
Cite this article
Wang, J.S.P. The mautner phenomenon forp-adic Lie groups. Math Z 185, 403–412 (1984). https://doi.org/10.1007/BF01215048
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01215048