AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions on compact sets in spaces of one or more complex variables during the last two decades
In this article, we point out the connections between the distinguished varieties introduced by Agle...
AbstractLet H(E) be the space of complex valued holomorphic functions on a complex Banach space E. T...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
This thesis is a study of approximation of holomorphic functions, by polynomials, rational functions...
In this article we examine necessary and sufficient conditions for the predual of the space of holom...
This thesis consists of three contributions to the theory of complex approximation on Riemann surfac...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
Vitushkin-type theorems on the approximation by holomorphic functions in the complex plane are estab...
We prove a version of the Bernstein-Walsh theorem on uniform polynomial approximation of holomorphic...
AbstractWe study the approximation property for spaces of Fréchet and Gâteaux holomorphic functions ...
AbstractFor an open subset U of a locally convex space E, let (H(U),τ0) denote the vector space of a...
The famous Weierstrass theorem asserts that every continuous function on a compact set in R-d can be...
In this article, we point out the connections between the distinguished varieties introduced by Agle...
AbstractLet H(E) be the space of complex valued holomorphic functions on a complex Banach space E. T...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
This thesis is a study of approximation of holomorphic functions, by polynomials, rational functions...
In this article we examine necessary and sufficient conditions for the predual of the space of holom...
This thesis consists of three contributions to the theory of complex approximation on Riemann surfac...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
We give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of...
Vitushkin-type theorems on the approximation by holomorphic functions in the complex plane are estab...
We prove a version of the Bernstein-Walsh theorem on uniform polynomial approximation of holomorphic...
AbstractWe study the approximation property for spaces of Fréchet and Gâteaux holomorphic functions ...
AbstractFor an open subset U of a locally convex space E, let (H(U),τ0) denote the vector space of a...
The famous Weierstrass theorem asserts that every continuous function on a compact set in R-d can be...
In this article, we point out the connections between the distinguished varieties introduced by Agle...
AbstractLet H(E) be the space of complex valued holomorphic functions on a complex Banach space E. T...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
DOI
Add to ORKG