Timeline for Is there a uniformly continuous injective image of $(0,1)\setminus\Bbb Q$ in the Cantor space?
Current License: CC BY-SA 4.0
5 events
| when toggle format | what | by | license | comment | |
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| Feb 6 at 15:50 | review | Close votes | |||
| Feb 11 at 3:09 | |||||
| Feb 5 at 13:01 | comment | added | Boaz Tsaban | @bof You are right. Thanks! For interested readers, here is one proof of your statement: math.stackexchange.com/questions/245237/… | |
| Feb 5 at 12:39 | answer | added | Pierre PC | timeline score: 3 | |
| Feb 5 at 12:36 | comment | added | bof | Doesn't a uniformly continuous map from $(0,1)\setminus\mathbb Q$ to a compact metric space have a continuous extension to $[0,1]$? But a continuous map from $[0,1]$ to the Cantor space is constant. What am I missing? | |
| Feb 5 at 12:07 | history | asked | Boaz Tsaban | CC BY-SA 4.0 |