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An analogue of Hardy's theorem for semi-simple Lie groups

Author(s): J. Sengupta
Journal: Proc. Amer. Math. Soc. 128 (2000), 2493-2499.
MSC (1991): Primary 22E30; Secondary 22E46, 43A30
Posted: February 25, 2000
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Abstract:

A well known theorem of Hardy on Fourier transform pairs says that a function on ${\mathbf R}^n$ and its Fourier transform $\stackrel{\wedge}{f}$ cannot both be ``very rapidly decreasing''. We prove here an analogue of this result in the case of semi-simple Lie groups.

References:

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[2]: H. Dym and H. P. McKean, Fourier series and integrals, Academic Press, New York, 1972. MR 56:945
[3]: D. Milicic, Asymptotic behaviour of matrix coefficients of the discrete series, Duke Math. Jl, 44 (1977), 59-88. MR 55:3171
[4]: A. Sitaram and M. Sundari, An analogue of Hardy's theorem for very rapidly decreasing functions on semi-simple groups, Pacific. Jl. Math, 177 (1997) 187-200. MR 99a:22018
[5]: N. Wallach, Real reductive groups, vol 1 and 2, Academic Press, New York. MR 89i:22029; MR 93m:22018


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