Timeline for Continuous function $f$ is uniformly continuous on $D$ $\iff$ (when $x_n,y_n \in D$ then $|x_n-y_n| \rightarrow 0 \implies |f(x)-f(y)| \rightarrow 0)$
Current License: CC BY-SA 4.0
10 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Oct 31, 2023 at 16:19 | vote | accept | John Doe | ||
| Oct 31, 2023 at 15:41 | history | edited | John Doe | CC BY-SA 4.0 | added 329 characters in body; edited title |
| S Oct 31, 2023 at 15:30 | vote | accept | John Doe | ||
| Oct 31, 2023 at 15:34 | |||||
| S Oct 31, 2023 at 15:30 | vote | accept | John Doe | ||
| S Oct 31, 2023 at 15:30 | |||||
| S Oct 31, 2023 at 15:30 | vote | accept | John Doe | ||
| S Oct 31, 2023 at 15:30 | |||||
| Oct 31, 2023 at 15:30 | vote | accept | John Doe | ||
| S Oct 31, 2023 at 15:30 | |||||
| Oct 31, 2023 at 15:24 | answer | added | M W | timeline score: 2 | |
| Oct 31, 2023 at 15:11 | answer | added | Lorenzo Vanni | timeline score: 2 | |
| Oct 31, 2023 at 14:26 | comment | added | ajr | It might make things a bit clearer if you write explicitly (with $\epsilon$ and $\delta$) what the right-hand statement means. | |
| Oct 31, 2023 at 14:09 | history | asked | John Doe | CC BY-SA 4.0 |