The aim of this paper is to give a characterization of the finite-dimensional subspaces of Lp, 1 ≤ p \u3c ∞, and C0(T) whose metric projections admit linear selections. The paper also gives a characterization of finite co-dimensional subspaces of l1 and c0 whose metric projections have linear selections. © 1985
AbstractWe study the problem of existence of pointwise-Lipschitz-continuous selections for the metri...
AbstractIn this paper we give a characterization of those n-dimensional subspaces of C0(X), where X ...
AbstractIn this note we consider Chebyshev subspaces (i.e., those that contain a unique nearest elem...
AbstractA characterization is given of those proximinal subspaces of a normed linear space whose (se...
AbstractThe aim of this paper is to give a characterization of the finite-dimensional subspaces of L...
AbstractA characterization is given of those proximinal subspaces of a normed linear space whose (se...
AbstractA characterization is given of those subspaces of Lp space whose metric projection is linear...
AbstractIn this paper we give a characterization of those n-dimensional subspaces of C0(X), where X ...
AbstractAn intrinsic characterization is given of those finite-dimensional subspaces whose metric pr...
AbstractCharacterizations are given of when the metric projection PM onto a proximal subspace M has ...
AbstractBest approximation in C(X) by elements of a Chebyshev subspace is governed by Haar's theorem...
AbstractX is a compact Hausdorff space and C(X) the Banach space of real-valued continuous functions...
AbstractLet T be a locally compact Hausdorff space and let G denote a finite-dimensional subspace of...
AbstractThe main result in this paper is the characterization of all n-dimensional weak Chebyshev Z ...
AbstractAn intrinsic characterization is given of those finite-dimensional subspaces whose metric pr...
AbstractWe study the problem of existence of pointwise-Lipschitz-continuous selections for the metri...
AbstractIn this paper we give a characterization of those n-dimensional subspaces of C0(X), where X ...
AbstractIn this note we consider Chebyshev subspaces (i.e., those that contain a unique nearest elem...
AbstractA characterization is given of those proximinal subspaces of a normed linear space whose (se...
AbstractThe aim of this paper is to give a characterization of the finite-dimensional subspaces of L...
AbstractA characterization is given of those proximinal subspaces of a normed linear space whose (se...
AbstractA characterization is given of those subspaces of Lp space whose metric projection is linear...
AbstractIn this paper we give a characterization of those n-dimensional subspaces of C0(X), where X ...
AbstractAn intrinsic characterization is given of those finite-dimensional subspaces whose metric pr...
AbstractCharacterizations are given of when the metric projection PM onto a proximal subspace M has ...
AbstractBest approximation in C(X) by elements of a Chebyshev subspace is governed by Haar's theorem...
AbstractX is a compact Hausdorff space and C(X) the Banach space of real-valued continuous functions...
AbstractLet T be a locally compact Hausdorff space and let G denote a finite-dimensional subspace of...
AbstractThe main result in this paper is the characterization of all n-dimensional weak Chebyshev Z ...
AbstractAn intrinsic characterization is given of those finite-dimensional subspaces whose metric pr...
AbstractWe study the problem of existence of pointwise-Lipschitz-continuous selections for the metri...
AbstractIn this paper we give a characterization of those n-dimensional subspaces of C0(X), where X ...
AbstractIn this note we consider Chebyshev subspaces (i.e., those that contain a unique nearest elem...
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