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Tag Archives: skula topology
Skula spaces II: the Dow-Watson counterexample
Last time, we have started to explain some results due to A. Dow and S. Watson, and we have seen that every compact T0 scattered space of scattering height at most 3 is Skula, namely can be obtained from a … Continue reading
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Tagged scattered, skula topology
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Skula spaces I: clopen selectors
A Skula space is a space that is obtained from another space X by giving it the Skula topology instead, which is generated by the open sets and the closed sets of the original space X. In 1990, Alan Dow … Continue reading
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Tagged compactness, connectedness, noetherian, scattered, skula topology
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Sober subspaces and the Skula topology
It often happens that one wishes to show that a certain subspace A of a given sober space X is sober. The following is a pearl due to Keimel and Lawson, which was mentioned to me by Zhenchao Lyu in … Continue reading
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Tagged skula topology, sober space
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