Add to ORKGsummary:We prove several stability properties for the class of compact Hausdorff spaces $T$ such that $C(T)$ with the weak or the pointwise topology is in the class of Stegall. In particular, this class is closed under arbitrary products
AbstractWe characterize two topological properties in Banach spaces of type C(K), namely, being σ-fr...
AbstractNogura showed that whereas Arhangel'skiǐ's properties α1, α2 and α3 are preserved by finite ...
Viglino defined a Hausdorff topological space to be C-compact if each closed subset of the space is ...
summary:We prove several stability properties for the class of compact Hausdorff spaces $T$ such tha...
Abstract. We prove several stability properties for the class of compact Hausdorff spaces T such tha...
AbstractUsing modifications of the well-known construction of “double-arrow” space we give consisten...
The examples usually given as instances of topological spaces that have T1-separation but not T2-sep...
AbstractThe class of spaces in the title (denoted by Haus(e-comp)) is introduced and it is compared ...
summary:We consider the property of relative compactness of subspaces of Hausdorff spaces. Several e...
[EN] Corson's example shows that there exists a Banach space EE which is not weakly normal but EE co...
Developability and related properties (like weak developability,Gd-diagonal, G*d-diagonal, submetriz...
International audienceIt is known that the class of $K$-analytic spaces is stable under usco-compact...
AbstractWe give two methods of constructing families of sequentially compact Hausdorff spaces whose ...
In this article we consider the study of the -differentiability and -ifferentiability for convex fun...
The space PK of partial maps with compact domains (identified with their graphs) forms a subspace of...
AbstractWe characterize two topological properties in Banach spaces of type C(K), namely, being σ-fr...
AbstractNogura showed that whereas Arhangel'skiǐ's properties α1, α2 and α3 are preserved by finite ...
Viglino defined a Hausdorff topological space to be C-compact if each closed subset of the space is ...
summary:We prove several stability properties for the class of compact Hausdorff spaces $T$ such tha...
Abstract. We prove several stability properties for the class of compact Hausdorff spaces T such tha...
AbstractUsing modifications of the well-known construction of “double-arrow” space we give consisten...
The examples usually given as instances of topological spaces that have T1-separation but not T2-sep...
AbstractThe class of spaces in the title (denoted by Haus(e-comp)) is introduced and it is compared ...
summary:We consider the property of relative compactness of subspaces of Hausdorff spaces. Several e...
[EN] Corson's example shows that there exists a Banach space EE which is not weakly normal but EE co...
Developability and related properties (like weak developability,Gd-diagonal, G*d-diagonal, submetriz...
International audienceIt is known that the class of $K$-analytic spaces is stable under usco-compact...
AbstractWe give two methods of constructing families of sequentially compact Hausdorff spaces whose ...
In this article we consider the study of the -differentiability and -ifferentiability for convex fun...
The space PK of partial maps with compact domains (identified with their graphs) forms a subspace of...
AbstractWe characterize two topological properties in Banach spaces of type C(K), namely, being σ-fr...
AbstractNogura showed that whereas Arhangel'skiǐ's properties α1, α2 and α3 are preserved by finite ...
Viglino defined a Hausdorff topological space to be C-compact if each closed subset of the space is ...