Geodesic
Characterization of the Lp-Range of the Poisson Transform in Hyperbolic Spaces <b>B</b>(Fn)
A. Boussejra1 ; H. Sami23
1Dept. of Mathematics, Faculty of Sciences, University Ibn Tofail, Kénitra, Morocco
2Dept. of Mathematics, Faculty of Sciences, University Hassan II, Casablanca, Morocco
3[
Journal of Lie Theory, Tome 12 (2002) no. 1, pp. 1-14

Voir la notice de l'article provenant de la source Heldermann Verlag

\newcommand{\sC}{{\mathbb C}} \newcommand{\sF}{{\mathbb F}} \newcommand{\sR}{{\mathbb R}} \newcommand{\sH}{{\mathbb H}} The aim of this paper is to give, in a unified manner, the characterization of the $L^p$-range ($p\geq 2$) of the Poisson transform $P_{\lambda}$ for the hyperbolic spaces $B({\sF}^n)$ over ${\sF}=\sR, \, \sC$ or the quaternions $\sH$. Namely, if $\Delta $ is the Laplace-Beltrami operator of $B({\sF}^n)$ and $sF$ a $\sC$-valued function on $B({\sF}^n)$ satisfying $\Delta F=-(\lambda ^2+\sigma ^2)F; \lambda \in \sR ^{*}$ then we establish: i) F is the Poisson transform of some $f\in L^2(\partial B({\sF}^n))$ (ie $P_{\lambda}f=F$) if and only if it satisfies the growth condition: $$ \sup _{t >0}\frac{1}{t}\int_{B(0,t)} 'F(x)'^2d \mu (x)+\infty,$$ where $B(0,t)$ is the ball of radius $t$ centered at $0$ and $d\mu $ the invariant measure on $B({\sF}^n)$. ii) F is the Poisson transform of some $f\in L^p(\partial B({\sF}^n))$, $p\geq 2$; if and only if it satisfies the following Hardy-type growth condition: $$ \sup _{0\leq r 1} (1-r^2)^{-\frac{\sigma }{2}}\left ( \int_{\partial B({\sF}^n)} 'F(r\theta)'^p d\theta ) \right ) ^{\frac{1}{p}} +\infty .$$
Mots-clés : Hyperbolic spaces, Poisson transform, Calderon Zygumund estimates, Jacobi functions

A. Boussejra  1   ; H. Sami  2 , 3

1 Dept. of Mathematics, Faculty of Sciences, University Ibn Tofail, Kénitra, Morocco
2 Dept. of Mathematics, Faculty of Sciences, University Hassan II, Casablanca, Morocco
3 [ 
A. Boussejra; H. Sami. Characterization of the Lp-Range of the Poisson Transform in Hyperbolic Spaces <b>B</b>(Fn). Journal of Lie Theory, Tome 12 (2002) no. 1, pp. 1-14. http://geodesic.mathdoc.fr/item/JOLT_2002_12_1_a0/
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     author = {A. Boussejra and H. Sami},
     title = { Characterization of the {L\protect\textsuperscript{p}-Range} of the {Poisson} {Transform} in {Hyperbolic} {Spaces} {&lt;b&gt;B&lt;/b&gt;(F\protect\textsuperscript{n})}},
     journal = {Journal of Lie Theory},
     pages = {1--14},
     year = {2002},
     volume = {12},
     number = {1},
     url = {http://geodesic.mathdoc.fr/item/JOLT_2002_12_1_a0/}
}
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