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Currently displaying 1 – 2 of 2

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The union of two D-spaces need not be D

Dániel T. Soukup; Paul J. Szeptycki — 2013

Fundamenta Mathematicae

We construct from ⋄ a T₂ example of a hereditarily Lindelöf space X that is not a D-space but is the union of two subspaces both of which are D-spaces. This answers a question of Arhangel'skii.

Partitioning bases of topological spaces

Dániel T. Soukup; Lajos Soukup — 2014

Commentationes Mathematicae Universitatis Carolinae

We investigate whether an arbitrary base for a dense-in-itself topological space can be partitioned into two bases. We prove that every base for a $T_{3}$ Lindelöf topology can be partitioned into two bases while there exists a consistent example of a first-countable, 0-dimensional, Hausdorff space of size $2^{ω}$ and weight $ω_{1}$ which admits a point countable base without a partition to two bases.

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