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Lp-functions satisfying the mean value property on homogeneous spaces

Part of: Lie groups Abstract harmonic analysis

Published online by Cambridge University Press:  09 April 2009

A. Sitaram  and
G. A. Willis
A. Sitaram
Affiliation:
Indian Statistical Institute, Bangalore 560 059, India
G. A. Willis
Affiliation:
The Australian National UniversityCanberra ACT 2601, Australia
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Abstract

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It is proved that on certain kinds of homogeneous spaces, the only Lp function, 1≤ p < ∞, satisfying the mean value property is the zero function.

MSC classification

Secondary: 22E99: None of the above, but in this section 43A85: Analysis on homogeneous spaces
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 56 , Issue 3 , June 1994 , pp. 384 - 390
Copyright
Copyright © Australian Mathematical Society 1994

References

[1]Berenstein, C. A. and Zalcman, L., ‘Pompeiu's problem on symmetric spaces’, Comment. Math. Helv. 55 (1980), 593621.CrossRefGoogle Scholar
[2]Furstenberg, H., ‘A Poisson formula for semisimple Lie groups’, Annals of Math. 77 (1963), 335386.CrossRefGoogle Scholar
[3]Grigoryan, A. A., ‘Stochastically complete manifolds and summable harmonic functions’, Mathematics of USSR—Izvestiya 33 (1989), 425432.CrossRefGoogle Scholar
[4]Helgason, S., Differential geometry, Lie groups and symmetric spaces (Acacdemic Press, San Diego, 1978).Google Scholar
[5]Karp, L., ‘Subharmonic functions, harmonic mappings and isometric immersions’, in: Seminar on differential geometry (ed. Yau, S. T.) (Princeton University Press, Princeton, 1982).Google Scholar
[6]Pati, V., Shahshahani, M. and Staram, A., ‘The spherical mean value operator for compact symmetric spaces’, Technical report, (Indian Statistical Institute—Bangalore Technical Report, 1989).Google Scholar
[7]Ragozin, D., ‘Zonal measure algebras in isotropy irreducilble homogeneous spaces’, J. of Funct. Anal. 17 (1974), 355376.CrossRefGoogle Scholar
[8]Rubin, W., Function theory in the unit ball of Cn (Springer, Berlin, 1980).Google Scholar
[9]Ruse, H. S., Walker, A. G. and Wilmore, T. J., Harmonic spaces (Edizione Cremonese, Rome, 1961).Google Scholar
[10]Sunada, T., ‘Spherical means and geodesic chains on a Riemannian manifold’, Trans. Amer. Math. Soc. 267 (1981), 483501.CrossRefGoogle Scholar
[11]Sunada, T., ‘Mean value theorem and ergodicity of certain random walks’, Compositio Math. 48 (1983), 129137.Google Scholar
[12]Thangavelu, S., ‘Spherical means on the Heisenberg group and a restriction theorem for the symplectic Fourier transforms’, preprint.Google Scholar