Timeline for Must a linearly ordered, separable space be metrizable?
Current License: CC BY-SA 2.5
7 events
| when toggle format | what | by | license | comment | |
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| Mar 1, 2011 at 19:51 | history | edited | Apollo | CC BY-SA 2.5 |
added 478 characters in body
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| Mar 1, 2011 at 11:26 | vote | accept | mathahada | ||
| Mar 1, 2011 at 19:03 | |||||
| Mar 1, 2011 at 0:24 | comment | added | Apollo | Actually, now that I think about it, yes it is separable: $[0,1]\times\{0,1\}$ ordered lexicographically. | |
| Mar 1, 2011 at 0:20 | comment | added | mathahada | What is the linear order the Sorgenfrey line is a subspace of? Is this linear order separable, too? | |
| Mar 1, 2011 at 0:19 | comment | added | Apollo | The Sorgenfrey line is a subspace of a linear order with the order topology, but yes, it is not an order topology | |
| Mar 1, 2011 at 0:04 | comment | added | mathahada | The Sorgenfrey line is not linearly ordered. | |
| Mar 1, 2011 at 0:01 | history | answered | Apollo | CC BY-SA 2.5 |