Add to ORKGLet Ω be a domain in the N-dimensional real space, L be an elliptic differential operator, and (Tn) be a sequence whose members belong to a certain class of operators defined on the space of L-analytic functions on Ω. It is proved in this paper the existence of a dense linear manifold of L-analytic functions all of whose nonzero members have maximal cluster sets under the action of every Tn along any curve ending at the boundary of Ω such that its ω-limit does not contain any component of the boundary. The above class contains all partial differentiation operators ∂ α, hence the statement extends earlier results due to Boivin, Gauthier and Paramonov, and to the first, third and fourth authors.Plan Andaluz de Investigación (Junta de Andalu...
We prove in this paper the following result which extends in a somewhat ‘linear’ sense a theorem by ...
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In this paper, it is proved that, for any domain G of the complex plane, there exist an infinite-dim...
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We prove in this paper the following result which extends in a somewhat ‘linear’ sense a theorem by ...
We prove in this paper that if G is a domain in the complex plane satisfying adequate topological or...
In this paper, it is proved that, for any domain G of the complex plane, there exist an infinite-dim...
AbstractThe existence of a dense linear manifold of holomorphic functions on a Jordan domain having ...
The existence of a dense linear manifold of holomorphic functions on a Jordan domain having except ...
AbstractIn this paper, we show that for a wide class of operators T—including infinite order differe...
In this paper, we show that for a wide class of operators T –including infi- nite order differentia...
We link the overconvergence properties of certain Taylor series in the unit disk to the maximality ...
Let (φn) be a sequence of holomorphic self-maps of a Jordan domain G in the complex plane. Under ap...
AbstractOur aim is to give lacunary versions with upper density equal to the value one of Arakelian'...
We consider the space of meromorphic functions in the unit disk $\mathbb{D}$ and show that there exi...
This is an expository paper where we relate some aspects of the problem of looking for holomorphic f...
AbstractLet Ω⊂RN (N⩾2) be an unbounded domain, and Lm be a homogeneous linear elliptic partial diffe...
International audienceGiven a domain of holomorphy D in C N , N ≥ 2, we show that the set of holomor...
AbstractAlthough the set of nowhere analytic functions on [0,1] is clearly not a linear space, we sh...
We prove in this paper the following result which extends in a somewhat ‘linear’ sense a theorem by ...
We prove in this paper that if G is a domain in the complex plane satisfying adequate topological or...
In this paper, it is proved that, for any domain G of the complex plane, there exist an infinite-dim...