AbstractA quasi-Chebyshev subspace of a Banach space X has been defined as one in which the set of best approximants for every x in X is non-empty and compact. This generalizes the well known concept of pseudo-Chebyshev property. In this paper we shall give various characterizations of quasi-Chebyshev subspaces in Banach spaces. Moreover, we present a characterization of the spaces in which all closed linear subspaces are quasi-Chebyshev
Abstract. The existence of Lipschitz quasiadditive projections on linear subspaces is investigated. ...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
We give a new proof of a characterization of the closeness of the range of a continuous linear ope...
We give simple proofs of some results of Mohebi [H. Mohebi, On quasi-Chebyshev subspaces of Banach s...
AbstractA closed subspace F in a Banach space X is called almost Chebyshev if the set of x ϵ X which...
AbstractAs natural generalizations of complemented subspaces, we introduce pseudo-complemented and s...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
AbstractWe examine to what extent finite-dimensional spaces defined on locally compact subsets of th...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
If A is a subset of the normed linear space X, then A is said to be proximinal in X if for each xÎX ...
The main aim of this survey is to present some classical as well asrecent characterizations involvin...
AbstractWe prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. ...
Chebyshev subspaces of $\mathcal{K}(c_0,c_0)$ are studied. A $k$-dimensional non-interpolating Cheby...
AbstractIn this paper, we study approximatively τ-compact and τ-strongly Chebyshev sets, where τ is ...
In this paper, we study approximatively τ-compact and τ-strongly Chebyshev sets, where τ is the norm...
Abstract. The existence of Lipschitz quasiadditive projections on linear subspaces is investigated. ...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
We give a new proof of a characterization of the closeness of the range of a continuous linear ope...
We give simple proofs of some results of Mohebi [H. Mohebi, On quasi-Chebyshev subspaces of Banach s...
AbstractA closed subspace F in a Banach space X is called almost Chebyshev if the set of x ϵ X which...
AbstractAs natural generalizations of complemented subspaces, we introduce pseudo-complemented and s...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
AbstractWe examine to what extent finite-dimensional spaces defined on locally compact subsets of th...
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In the ...
If A is a subset of the normed linear space X, then A is said to be proximinal in X if for each xÎX ...
The main aim of this survey is to present some classical as well asrecent characterizations involvin...
AbstractWe prove necessary and sufficient conditions for X to be a Chebyshev subspace of (L1 ⊕ R)∞. ...
Chebyshev subspaces of $\mathcal{K}(c_0,c_0)$ are studied. A $k$-dimensional non-interpolating Cheby...
AbstractIn this paper, we study approximatively τ-compact and τ-strongly Chebyshev sets, where τ is ...
In this paper, we study approximatively τ-compact and τ-strongly Chebyshev sets, where τ is the norm...
Abstract. The existence of Lipschitz quasiadditive projections on linear subspaces is investigated. ...
In this paper, we will discuss about topological properties of quasi-pseudometric spaces and propert...
We give a new proof of a characterization of the closeness of the range of a continuous linear ope...
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