If A is a subset of the normed linear space X, then A is said to be proximinal in X if for each xÎX there is a point y0ÎA such that the distance between x and A; d(x, A) = inf{||x-y||: yÎA}= ||x-y0||. The element y0 is called a best approximation for x from A. If for each xÎX, the best approximation for x from A is unique then the subset A is called a Chebyshev subset of X. In this paper the author studies the existence of finite dimensional Chebyshev subspaces of Lo
AbstractLet us say that a subspace M of a Banach space X is absolutely proximinal if it is proximina...
Chebyshev subspaces of $\mathcal{K}(c_0,c_0)$ are studied. A $k$-dimensional non-interpolating Cheby...
AbstractThe object of this paper is to prove the following theorem: If Y is a closed subspace of the...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
Chebyshev subspaces of L(l(n/1), l(n/1) are studied. A construction of a k-dimensional Chebyshev (n...
We prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. Moreover...
AbstractWe prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. ...
AbstractIn this note we consider Chebyshev subspaces (i.e., those that contain a unique nearest elem...
The main aim of this survey is to present some classical as well asrecent characterizations involvin...
AbstractWe examine to what extent finite-dimensional spaces defined on locally compact subsets of th...
AbstractLet A ⊂ R, F(A) denote the linear space of all real functions on A. A finite-dimensional sub...
Abstract. In this paper we show that if G is a non empty subset of a normed space X, y∈X, a scalar α...
AbstractA subset M of a normed linear space X is said to be proximinal if infm ϵ M ∥x − m∥ is attain...
AbstractThis paper deals with the problem of uniqueness of best Chebyshev approximations by subspace...
AbstractLet us say that a subspace M of a Banach space X is absolutely proximinal if it is proximina...
Chebyshev subspaces of $\mathcal{K}(c_0,c_0)$ are studied. A $k$-dimensional non-interpolating Cheby...
AbstractThe object of this paper is to prove the following theorem: If Y is a closed subspace of the...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
Chebyshev subspaces of L(l(n/1), l(n/1) are studied. A construction of a k-dimensional Chebyshev (n...
We prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. Moreover...
AbstractWe prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. ...
AbstractIn this note we consider Chebyshev subspaces (i.e., those that contain a unique nearest elem...
The main aim of this survey is to present some classical as well asrecent characterizations involvin...
AbstractWe examine to what extent finite-dimensional spaces defined on locally compact subsets of th...
AbstractLet A ⊂ R, F(A) denote the linear space of all real functions on A. A finite-dimensional sub...
Abstract. In this paper we show that if G is a non empty subset of a normed space X, y∈X, a scalar α...
AbstractA subset M of a normed linear space X is said to be proximinal if infm ϵ M ∥x − m∥ is attain...
AbstractThis paper deals with the problem of uniqueness of best Chebyshev approximations by subspace...
AbstractLet us say that a subspace M of a Banach space X is absolutely proximinal if it is proximina...
Chebyshev subspaces of $\mathcal{K}(c_0,c_0)$ are studied. A $k$-dimensional non-interpolating Cheby...
AbstractThe object of this paper is to prove the following theorem: If Y is a closed subspace of the...