AbstractIn this paper, which is a continuation of Timofte (J. Approx. Theory 119 (2002) 291–299, we give special uniform approximations of functions from CX⊗Y(T×S) and C∞(T×S,X⊗Y) by elements of the tensor products CX(T)⊗CY(S), respectively C0(T,X)⊗C0(S,Y), for topological spaces T,S and Γ-locally convex spaces X,Y (all four being Hausdorff)
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
Using a theorem on the approximation of the identity in the Banach space $C_u(Y)$ of all continuous...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractIn this paper, we give special uniform approximations of functions u from the spaces CX(T) a...
This book presents the evolution of uniform approximations of continuous functions. Starting from th...
Abstract: Let X,Y be real Banach spaces. Let Z be a Banach space partially ordered by a pointed clos...
The paper presents new approximation and fixed point results for ${\mathcal U}_{c}^{\kappa}$ maps in...
AbstractWe study the approximation property for spaces of Fréchet and Gâteaux holomorphic functions ...
Let X, Y be real Banach spaces. Let Z be a Banach space partially ordered by a pointed closed convex...
Abstract. The paper presents new approximation and fixed point results for Uκc maps in Hausdorff loc...
AbstractA theory of best approximation is developed in the normed linear space C(T, E), the space of...
AbstractLet Π be a collection of subsets of a compact set S in a normed linear space and K be all co...
AbstractWe show among other things that if B is a linear space of continuous real-valued functions v...
AbstractFor an open subset U of a locally convex space E, let (H(U),τ0) denote the vector space of a...
For an open subset U of a locally convex space E, let (H(U), tau(0)) denote the vector space of all ...
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
Using a theorem on the approximation of the identity in the Banach space $C_u(Y)$ of all continuous...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractIn this paper, we give special uniform approximations of functions u from the spaces CX(T) a...
This book presents the evolution of uniform approximations of continuous functions. Starting from th...
Abstract: Let X,Y be real Banach spaces. Let Z be a Banach space partially ordered by a pointed clos...
The paper presents new approximation and fixed point results for ${\mathcal U}_{c}^{\kappa}$ maps in...
AbstractWe study the approximation property for spaces of Fréchet and Gâteaux holomorphic functions ...
Let X, Y be real Banach spaces. Let Z be a Banach space partially ordered by a pointed closed convex...
Abstract. The paper presents new approximation and fixed point results for Uκc maps in Hausdorff loc...
AbstractA theory of best approximation is developed in the normed linear space C(T, E), the space of...
AbstractLet Π be a collection of subsets of a compact set S in a normed linear space and K be all co...
AbstractWe show among other things that if B is a linear space of continuous real-valued functions v...
AbstractFor an open subset U of a locally convex space E, let (H(U),τ0) denote the vector space of a...
For an open subset U of a locally convex space E, let (H(U), tau(0)) denote the vector space of all ...
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
Using a theorem on the approximation of the identity in the Banach space $C_u(Y)$ of all continuous...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...