Add to ORKGWe give a proof of the Oka-Weil theorem which states that on compact, polynomially convex subsets of Cn, holomorphic functions can be approximated uniformly by holomorphic polynomials.Vi ger ett bevis av Oka-Weil sats som säger att på kompakta och polynomkonvexa delmängder av Cn kan holomorfa funktioner approximeras likformigt med holomorfa polynom
AbstractIn this paper we show that the best approximation of a convex function by convex algebraic p...
AbstractA convex function f given on [−1, 1] can be approximated in Lp, 1 < p < ∞, by convex polynom...
AbstractWe prove that for each convex function ƒ ∈ Lp, 0 < p < 1, there exists a convex algebraic po...
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...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
Let n > be an integer. We prove that holomorphic maps from Stein manifolds X of dimension <n to the ...
We prove that the classical Oka property of a complex manifold Y, concerning the existence and homot...
We prove a version of the Bernstein-Walsh theorem on uniform polynomial approximation of holomorphic...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractThe classical Weierstrass theorem states that any function continuous on a compact set K⊂Rd(...
This book presents the evolution of uniform approximations of continuous functions. Starting from th...
AbstractA convex function f given on [−1, 1] can be approximated in Lp, 1 < p < ∞, by convex polynom...
AbstractIn this paper we show that the best approximation of a convex function by convex algebraic p...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
AbstractIn this paper we show that the best approximation of a convex function by convex algebraic p...
AbstractA convex function f given on [−1, 1] can be approximated in Lp, 1 < p < ∞, by convex polynom...
AbstractWe prove that for each convex function ƒ ∈ Lp, 0 < p < 1, there exists a convex algebraic po...
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...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
Let n > be an integer. We prove that holomorphic maps from Stein manifolds X of dimension <n to the ...
We prove that the classical Oka property of a complex manifold Y, concerning the existence and homot...
We prove a version of the Bernstein-Walsh theorem on uniform polynomial approximation of holomorphic...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractThe classical Weierstrass theorem states that any function continuous on a compact set K⊂Rd(...
This book presents the evolution of uniform approximations of continuous functions. Starting from th...
AbstractA convex function f given on [−1, 1] can be approximated in Lp, 1 < p < ∞, by convex polynom...
AbstractIn this paper we show that the best approximation of a convex function by convex algebraic p...
AbstractThis article gives a survey of the study of uniform approximation by holomorphic functions o...
AbstractIn this paper we show that the best approximation of a convex function by convex algebraic p...
AbstractA convex function f given on [−1, 1] can be approximated in Lp, 1 < p < ∞, by convex polynom...
AbstractWe prove that for each convex function ƒ ∈ Lp, 0 < p < 1, there exists a convex algebraic po...