AbstractIn the present article we study an interpolation problem for classes of analytic functions, in a systematic manner. More precisely, we provide sufficient conditions so that proper and “big”, in the Baire category sense, subclasses of analytic functions have an interpolation property at an infinite set of points. We then apply our main theorems to several classes of universal, hypercyclic functions
The theory of interpolation spaces has its origin in the classical work of Riesz and Marcinkiewicz b...
We deal with interpolation problems in spaces ${\mathcal A}_p(\C)$ of entire functions such that $\s...
The following work is concerned mainly with questions associated with the interpolation of a regular...
AbstractIn the present article we study an interpolation problem for classes of analytic functions, ...
The conclusions of various interpolation theorems are different in nature. Some of them only allow o...
AbstractLet D be a domain in the complex plane, let {zn} be a sequence of distinct points in D, and ...
International audienceIt is known (implicit in [HMNT]) that when $\Lambda$ is an interpolating seque...
As surprising as it may seem, there exist infinitely differentiable functions which are nowhere anal...
summary:Let $H(K)$ be the Hilbert space with reproducing kernel $K$. This paper characterizes some...
We give a necessary and sufficient condition for a sequence [ak}k in the unit ball of C° to be inter...
AbstractWe investigate the following problem: For which open simply connected domains do there exist...
A general interpolation problem (which includes as particular cases the Nevanlinna–Pick and Carathéo...
Abstract. Schwarz’s Lemma leads to a natural interpolation prob-lem for analytic functions from the ...
AbstractThis paper studies a generalization of polynomial interpolation: given a continuous function...
We established a condition on boundary curves (ending at points) lying either in the unit disc or th...
The theory of interpolation spaces has its origin in the classical work of Riesz and Marcinkiewicz b...
We deal with interpolation problems in spaces ${\mathcal A}_p(\C)$ of entire functions such that $\s...
The following work is concerned mainly with questions associated with the interpolation of a regular...
AbstractIn the present article we study an interpolation problem for classes of analytic functions, ...
The conclusions of various interpolation theorems are different in nature. Some of them only allow o...
AbstractLet D be a domain in the complex plane, let {zn} be a sequence of distinct points in D, and ...
International audienceIt is known (implicit in [HMNT]) that when $\Lambda$ is an interpolating seque...
As surprising as it may seem, there exist infinitely differentiable functions which are nowhere anal...
summary:Let $H(K)$ be the Hilbert space with reproducing kernel $K$. This paper characterizes some...
We give a necessary and sufficient condition for a sequence [ak}k in the unit ball of C° to be inter...
AbstractWe investigate the following problem: For which open simply connected domains do there exist...
A general interpolation problem (which includes as particular cases the Nevanlinna–Pick and Carathéo...
Abstract. Schwarz’s Lemma leads to a natural interpolation prob-lem for analytic functions from the ...
AbstractThis paper studies a generalization of polynomial interpolation: given a continuous function...
We established a condition on boundary curves (ending at points) lying either in the unit disc or th...
The theory of interpolation spaces has its origin in the classical work of Riesz and Marcinkiewicz b...
We deal with interpolation problems in spaces ${\mathcal A}_p(\C)$ of entire functions such that $\s...
The following work is concerned mainly with questions associated with the interpolation of a regular...
DOI
Add to ORKG