Timeline for Upper and lower bounds of sequences whose product of terms is asymptotically equal to their arithmetic mean
Current License: CC BY-SA 3.0
10 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Apr 26, 2018 at 20:09 | vote | accept | Sylvain JULIEN | ||
| Apr 26, 2018 at 15:19 | answer | added | Iosif Pinelis | timeline score: 2 | |
| Apr 26, 2018 at 15:13 | answer | added | Gerhard Paseman | timeline score: 0 | |
| Apr 26, 2018 at 14:25 | comment | added | Sylvain JULIEN | Yes, I mean an open interval, at least of Lebesgue measure different from $ 0 $ . As for hypothetical values outside such an interval, I require only finitely many of them. | |
| Apr 26, 2018 at 14:18 | comment | added | Iosif Pinelis | By "some interval containing 1", do you mean an open interval? E.g., the interval [1,1] of length 0 is also an interval containing 1. Also, may some of the c_k's be outside that interval? | |
| Apr 26, 2018 at 14:05 | comment | added | Sylvain JULIEN | This question comes from math.stackexchange.com/questions/2750552/probability-of-m-to-be-a-primality-radius-of-n, where the sequence $ c_{k} $ might be a corridor sequence. | |
| Apr 26, 2018 at 14:02 | comment | added | Sylvain JULIEN | No, I'm really thinking about sequences containing terms quite close to $ 1 $. Without the density requirement a sequence like $ 1/2, 2, 1, 1,1,... $ would do the job. | |
| Apr 26, 2018 at 13:17 | comment | added | Anthony Quas | Did you want an mth root? | |
| Apr 26, 2018 at 12:37 | history | edited | Sylvain JULIEN | CC BY-SA 3.0 |
added 97 characters in body
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| Apr 26, 2018 at 12:31 | history | asked | Sylvain JULIEN | CC BY-SA 3.0 |