1. Twisted spherical means in annular regions in $C ^n$ and support theorems
- Author
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Rawat, Rama and Srivastava, R. K.
- Subjects
Mathematics - Functional Analysis ,43A85, 44A35, 53C65 ,FOS: Mathematics ,Functional Analysis (math.FA) - Abstract
Let $Z(Ann(r,R))$ be the class of all continuous functions $f$ on the annulus $Ann(r,R)$ in $\mathbb C^n$ with twisted spherical mean $f \times ��_s(z)=0,$ whenever $z\in \mathbb C^n$ and $s >0$ satisfy the condition that the sphere $S_s(z)\subseteq Ann(r, R) $ and ball $B_r(0)\subseteq B_s(z).$ In this paper, we give a characterization for functions in $Z(Ann(r,R))$ in terms of their spherical harmonic coefficients. We also prove support theorems for the twisted spherical means in $\mathbb C^n$ which improve some of the earlier results., Published: Annales de l'institut Fourier, 59 no. 6 (2009), p. 2509-2523
- Published
- 2009
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