Add to ORKGIf $\Omega$ is a domain of holomorphy in $\Bbb C^n$, having a compact topological closure into another domain of holomorphy $U\subset \Bbb C^n$ such that $(\Omega,U)$ is a Runge pair, we construct a function $F$ holomorphic in $\Omega$ which is singular at every boundary point of $\Omega$ and such that $F$ is in $L^p(\Omega)$, for any $p\in (0,+\infty)$
International audienceGiven a domain of holomorphy D in C N , N ≥ 2, we show that the set of holomor...
summary:For a domain $\Omega \subset {\mathbb{C}}^n$ let $H(\Omega )$ be the holomorphic functions o...
We prove in this paper that if G is a domain in the complex plane satisfying adequate topological or...
We prove H^p (1<p<∞) extensions of holomorphic functions from submanifolds of a strictly pseudoconve...
Let U be some finitely connected domain in C and let f : U → U be holomorphic. If f (U) has compact ...
AbstractWe show that a Riemann domain Ω over a symmetrically regular Banach space E admits holomorph...
Some problems concerning holomorphic continuation of the class of bounded holomorphic functions fro...
AbstractWe provide a new proof of the Wong–Rosay theorem, using the structure of the ring of holomor...
AbstractIn this note, we give a characterization for a pair of pseudoconvex domains in Cn, (D′,D), D...
It is well known that there exist domains Ω in Cn,n ≥ 2, such that all holomorphic functions in Ω c...
In this paper, the linear structure of the family He(G) of holomorphic functions in a domain G of th...
We wish to study those domains in Cn,for n ≥ 2, the so-called domains of holomorphy, which are in s...
We prove in this paper the following result which extends in a somewhat ‘linear’ sense a theorem by ...
We discuss interrelations between $H^{\infty}$-convex domains and $H^{\infty}$-domains of holo morph...
AbstractLet Ω be a domain in Cn. Let H(Ω) be the linear space over C of the holomorphic functions in...
International audienceGiven a domain of holomorphy D in C N , N ≥ 2, we show that the set of holomor...
summary:For a domain $\Omega \subset {\mathbb{C}}^n$ let $H(\Omega )$ be the holomorphic functions o...
We prove in this paper that if G is a domain in the complex plane satisfying adequate topological or...
We prove H^p (1<p<∞) extensions of holomorphic functions from submanifolds of a strictly pseudoconve...
Let U be some finitely connected domain in C and let f : U → U be holomorphic. If f (U) has compact ...
AbstractWe show that a Riemann domain Ω over a symmetrically regular Banach space E admits holomorph...
Some problems concerning holomorphic continuation of the class of bounded holomorphic functions fro...
AbstractWe provide a new proof of the Wong–Rosay theorem, using the structure of the ring of holomor...
AbstractIn this note, we give a characterization for a pair of pseudoconvex domains in Cn, (D′,D), D...
It is well known that there exist domains Ω in Cn,n ≥ 2, such that all holomorphic functions in Ω c...
In this paper, the linear structure of the family He(G) of holomorphic functions in a domain G of th...
We wish to study those domains in Cn,for n ≥ 2, the so-called domains of holomorphy, which are in s...
We prove in this paper the following result which extends in a somewhat ‘linear’ sense a theorem by ...
We discuss interrelations between $H^{\infty}$-convex domains and $H^{\infty}$-domains of holo morph...
AbstractLet Ω be a domain in Cn. Let H(Ω) be the linear space over C of the holomorphic functions in...
International audienceGiven a domain of holomorphy D in C N , N ≥ 2, we show that the set of holomor...
summary:For a domain $\Omega \subset {\mathbb{C}}^n$ let $H(\Omega )$ be the holomorphic functions o...
We prove in this paper that if G is a domain in the complex plane satisfying adequate topological or...