Timeline for Is there a real-analytic approach to evaluate a definite integral (with an elementary integrand) whose value involves Lambert $W$?
Current License: CC BY-SA 4.0
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| S Jun 24, 2023 at 19:09 | history | bounty ended | CommunityBot | ||
| S Jun 24, 2023 at 19:09 | history | notice removed | CommunityBot | ||
| Jun 21, 2023 at 21:23 | comment | added | mick | +1 to OP and Tom's comment. I might be biased for liking the Lambert-W function though. | |
| Jun 16, 2023 at 18:06 | comment | added | Tom Copeland | Might be helpful to note that Euler's tree function is T(x) = -LambertW(-x), where W(x) is the principal branch of Lambert's function, and T(x) is the e.g.f. of OEIS A000169. There are numerous entries in the OEIS involving the tree function / Lambert function. | |
| S Jun 16, 2023 at 17:10 | history | bounty started | TheSimpliFire | ||
| S Jun 16, 2023 at 17:10 | history | notice added | TheSimpliFire | Draw attention | |
| Jun 16, 2023 at 17:09 | history | edited | TheSimpliFire | CC BY-SA 4.0 |
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| S Aug 21, 2022 at 17:01 | history | bounty ended | CommunityBot | ||
| S Aug 21, 2022 at 17:01 | history | notice removed | CommunityBot | ||
| S Aug 13, 2022 at 14:57 | history | bounty started | TheSimpliFire | ||
| S Aug 13, 2022 at 14:57 | history | notice added | TheSimpliFire | Draw attention | |
| Aug 11, 2022 at 20:04 | history | edited | TheSimpliFire | CC BY-SA 4.0 |
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| Aug 11, 2022 at 10:56 | history | asked | TheSimpliFire | CC BY-SA 4.0 |