18 pagesInternational audienceWe study radial behavior of analytic and harmonic functions, which admit a certain majorant in the unit disk. We prove that extremal growth or decay may occur only along small sets of radii and give precise estimates of these exceptional sets
AbstractLet ΓKD be the unit ball of the space of all bounded harmonic functions in a domain D in R3,...
The classical problem of the stability of stationary stellar spherical models with purely radial mot...
Abstract. Let f be transcendental and meromorphic in the plane. We obtain sharp lower bounds for the...
18 pagesInternational audienceWe study radial behavior of analytic and harmonic functions, which adm...
Let $\Psi_v$ be the class of harmonic functions in the unit disk or unit ball in ${\mathsf R}^m$ whi...
This paper considers the radial variation function F(r, t) of an analytic function f(z) on the disc ...
This paper considers the radial variation function F(r, t) of an an- alytic function f(z) on the di...
We continue our study begun in \cite{HR3} concerning the radial growth of functions in the model spa...
In the present lecture notes, we shall discuss the relation between the growth of har-monic function...
A well known result of Beurling asserts that if f is a function which is analytic in the unit disc ∆...
AbstractLet f(z) belong to the well-known class S of functions univalent in the unit disk. It is sho...
Abstract. We study the growth of functions which are harmonic in any number of variables. The result...
Abstract. By virtue of the extremal function $f(z) $ for $S^{*}(\alpha) $ which is the class of all ...
AbstractLet E be a compact subset of the unit circle. We determine the extremal rate of growth of (∥...
This thesis falls naturally into two distinct parts. Both come under the general heading of the theo...
AbstractLet ΓKD be the unit ball of the space of all bounded harmonic functions in a domain D in R3,...
The classical problem of the stability of stationary stellar spherical models with purely radial mot...
Abstract. Let f be transcendental and meromorphic in the plane. We obtain sharp lower bounds for the...
18 pagesInternational audienceWe study radial behavior of analytic and harmonic functions, which adm...
Let $\Psi_v$ be the class of harmonic functions in the unit disk or unit ball in ${\mathsf R}^m$ whi...
This paper considers the radial variation function F(r, t) of an analytic function f(z) on the disc ...
This paper considers the radial variation function F(r, t) of an an- alytic function f(z) on the di...
We continue our study begun in \cite{HR3} concerning the radial growth of functions in the model spa...
In the present lecture notes, we shall discuss the relation between the growth of har-monic function...
A well known result of Beurling asserts that if f is a function which is analytic in the unit disc ∆...
AbstractLet f(z) belong to the well-known class S of functions univalent in the unit disk. It is sho...
Abstract. We study the growth of functions which are harmonic in any number of variables. The result...
Abstract. By virtue of the extremal function $f(z) $ for $S^{*}(\alpha) $ which is the class of all ...
AbstractLet E be a compact subset of the unit circle. We determine the extremal rate of growth of (∥...
This thesis falls naturally into two distinct parts. Both come under the general heading of the theo...
AbstractLet ΓKD be the unit ball of the space of all bounded harmonic functions in a domain D in R3,...
The classical problem of the stability of stationary stellar spherical models with purely radial mot...
Abstract. Let f be transcendental and meromorphic in the plane. We obtain sharp lower bounds for the...
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