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As a byproduct of a discussion with a friend, I tried to find the properties of the real line if you define neighbourhoods by closed intervals. However I quickly got stuck with this problem. So to the questions. Can one define neighbourhoods by closed intervals? I do not see why not. Are the intervals of the form (a,b) now considered closed? Can [a,a]={a} be considered a neighbourhood? Is it metrizable? My guess is no but I cannot see why it shouldn't be second countable. |
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closed as off topic by Ryan Budney, Bill Johnson, Andres Caicedo, Joel David Hamkins, Will Jagy Oct 26 2011 at 23:17 |
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If you allow $[a,a]$ as a neighbourhood of $a$, then the topology is discrete and there is nothing more to say (in particular it is metrizable). If you only allow non-trivial closed intervals, then you have a finer topology, because every $]a,b[$ is still open. But every open set for this new topology is also open for the usual topology (because there must be a non trivial closed interval around every point, so there is also a non trivial open interval), so the topology you get is in fact exactly the usual topology of $\mathbb{R}$. |
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The union of infinitely many closed intervals is not necessarily a closed interval, i.e. $\bigcup_{n = 1}^\infty [1/n, 1] = (0, 1]$, so this is not even a topology. If you do as Guillaume Brunerie and David White are implicitly assuming and generate a topology via closed intervals, you get the discrete topology. If you take the above computation as a hint and look at right-half-closed intervals or left-half-closed intervals, you get what Pietro Majer said, the Sorgenfrey topology. |
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