Add to ORKGLet P(z,β) be the Poisson kernel in the unit disk , and let $P_{λ}f(z) = ʃ_{∂} P(z,φ)^{1//2+λ} f(φ)dφ$ be the λ -Poisson integral of f, where $f ∈ L^p(∂)$. We let $P_{λ}f$ be the normalization $P_{λ}f//P_{λ}1$. If λ >0, we know that the best (regular) regions where $P_{λ}f$ converges to f for a.a. points on ∂ are of nontangential type. If λ =0 the situation is different. In a previous paper, we proved a result concerning the convergence of $P_0f$ toward f in an $L^p$ weakly tangential region, if $f ∈ L^p(∂)$ and p > 1. In the present paper we will extend the result to symmetric spaces X of rank 1. Let f be an $L^p$ function on the maximal distinguished boundary K/M of X. Then $P_{0}f(x)$ will converge to f(kM) as x tends to kM in an $L^p$ ...
We characterize the $L^p$-range, $1 < p < +\infty$, of the Poisson transform on the Shilov boundary ...
AbstractWe find asymptotic formulas for the least upper bounds of approximation in the metric of the...
AbstractA characterization is given for those eigenfunctions of invariant differential operators on ...
summary:If the Poisson integral of the unit disc is replaced by its square root, it is known that no...
Let ũ denote the conjugate Poisson integral of a function $f ∈ L^{p}(ℝ)$. We give conditions on a re...
Let X = G/K be a symmetric space of noncompact type, L be the Laplace-Beltrami operator on X, and b ...
Abstract. If f is a real-valued function on [−pi, pi] that is Henstock/Kurzweil integrable, let ur(θ...
This thesis uses both analytic and probabilistic methods to study continuous and discrete problems. ...
AbstractLet L = 12∑k = 1d Vk2 + V0 be a smooth second order differential operator on Rn written in H...
AbstractWe characterize the Lp-range, 1<p<+∞, of the Poisson transform on the Shilov boundary for no...
AbstractWe provide a simple method for obtaining boundary asymptotics of the Poisson kernel on a dom...
Pick n points independently at random in R2, according to a prescribed probability measure µ, and le...
International audienceWe consider a Poisson point process on IR2 whose support is defined in polar c...
An extension is obtained to the case of a real rank one noncompact symmetric space G/K of the soluti...
In this paper, we study the regularity of solutions to the p-Poisson equation for all 1 < p <∞...
We characterize the $L^p$-range, $1 < p < +\infty$, of the Poisson transform on the Shilov boundary ...
AbstractWe find asymptotic formulas for the least upper bounds of approximation in the metric of the...
AbstractA characterization is given for those eigenfunctions of invariant differential operators on ...
summary:If the Poisson integral of the unit disc is replaced by its square root, it is known that no...
Let ũ denote the conjugate Poisson integral of a function $f ∈ L^{p}(ℝ)$. We give conditions on a re...
Let X = G/K be a symmetric space of noncompact type, L be the Laplace-Beltrami operator on X, and b ...
Abstract. If f is a real-valued function on [−pi, pi] that is Henstock/Kurzweil integrable, let ur(θ...
This thesis uses both analytic and probabilistic methods to study continuous and discrete problems. ...
AbstractLet L = 12∑k = 1d Vk2 + V0 be a smooth second order differential operator on Rn written in H...
AbstractWe characterize the Lp-range, 1<p<+∞, of the Poisson transform on the Shilov boundary for no...
AbstractWe provide a simple method for obtaining boundary asymptotics of the Poisson kernel on a dom...
Pick n points independently at random in R2, according to a prescribed probability measure µ, and le...
International audienceWe consider a Poisson point process on IR2 whose support is defined in polar c...
An extension is obtained to the case of a real rank one noncompact symmetric space G/K of the soluti...
In this paper, we study the regularity of solutions to the p-Poisson equation for all 1 < p <∞...
We characterize the $L^p$-range, $1 < p < +\infty$, of the Poisson transform on the Shilov boundary ...
AbstractWe find asymptotic formulas for the least upper bounds of approximation in the metric of the...
AbstractA characterization is given for those eigenfunctions of invariant differential operators on ...