AbstractWhen A is a subspace of C(X) with Choquet boundary ΣA and F is a compact subset of ΣA, this note gives conditions for interpolation of the restriction subspace A ¦f in terms of measures living on ΣA and annihilating A. Also a general peak point criterion for subspaces of C(X) is established
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
An analogue of the notion of uniformly separated sequences, expressed in terms of extremal functions...
AbstractWe show among other things that if B is a linear space of continuous real-valued functions v...
AbstractWhen A is a subspace of C(X) with Choquet boundary ΣA and F is a compact subset of ΣA, this ...
AbstractLet A be a subspace of C(X), and let K ⊆ X be an interpolation set for A. Let F be a Banach ...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractFork=2 and 3, B. Shekhtman proved thatn+k−1 is the smallest dimension of a subspace,F⊆C(Rn) ...
Abstract. A subspace Y of a Banach space X is an almost constrained (AC) subspace if any family of c...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
AbstractIn this paper we prove that if A is a strongly separating linear subspace of C0(X), that is,...
AbstractLet F be a closed face of the weak∗ compact convex state space of a unital C∗-algebra A. The...
AbstractGiven Banach spaces X, a subspace Y, and a finite set G of bounded linear functionals on Y, ...
AbstractIt is shown that, for a class of finite dimensional subspaces G of C(X), where X is a certai...
AbstractThis note presents a study of measures on [0, 1] annihilating subspaces E ⊂ C[0, 1] which co...
AbstractWe construct a two-dimensional subspace V ⊂ C(K) such that an interpolating projection on V ...
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
An analogue of the notion of uniformly separated sequences, expressed in terms of extremal functions...
AbstractWe show among other things that if B is a linear space of continuous real-valued functions v...
AbstractWhen A is a subspace of C(X) with Choquet boundary ΣA and F is a compact subset of ΣA, this ...
AbstractLet A be a subspace of C(X), and let K ⊆ X be an interpolation set for A. Let F be a Banach ...
AbstractLet X be a compact Hausdorff space and let A be a closed linear subspace of CC(X) containing...
AbstractFork=2 and 3, B. Shekhtman proved thatn+k−1 is the smallest dimension of a subspace,F⊆C(Rn) ...
Abstract. A subspace Y of a Banach space X is an almost constrained (AC) subspace if any family of c...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
AbstractIn this paper we prove that if A is a strongly separating linear subspace of C0(X), that is,...
AbstractLet F be a closed face of the weak∗ compact convex state space of a unital C∗-algebra A. The...
AbstractGiven Banach spaces X, a subspace Y, and a finite set G of bounded linear functionals on Y, ...
AbstractIt is shown that, for a class of finite dimensional subspaces G of C(X), where X is a certai...
AbstractThis note presents a study of measures on [0, 1] annihilating subspaces E ⊂ C[0, 1] which co...
AbstractWe construct a two-dimensional subspace V ⊂ C(K) such that an interpolating projection on V ...
Abstract. Let T be a compact Hausdorff topological space and let M denote an n–dimensional subspace ...
An analogue of the notion of uniformly separated sequences, expressed in terms of extremal functions...
AbstractWe show among other things that if B is a linear space of continuous real-valued functions v...
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