Timeline for On the Diophantine equation $x^{5} + y^5 = z^p$
Current License: CC BY-SA 4.0
6 events
| when toggle format | what | by | license | comment | |
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| Aug 9, 2020 at 9:42 | vote | accept | Q_p | ||
| Aug 9, 2020 at 9:31 | answer | added | Michael Stoll | timeline score: 10 | |
| Aug 9, 2020 at 8:52 | history | edited | Q_p | CC BY-SA 4.0 |
added 17 characters in body
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| Aug 9, 2020 at 8:42 | comment | added | Alapan Das | In 1998 B Poonen had proven that the equation $x^5+y^5=z^2$ has no integer solution for $x,y,z$ co-prime. | |
| Aug 9, 2020 at 8:25 | comment | added | Alapan Das | If Beal's conjecture is true, then $p$ must have to be $2$ so that $\text{gcd}(x,y,z)=1 \Rightarrow x,y,z$ are mutually co-prime. Hence, the problem becomes $x^5+y^5=z^2$ | |
| Aug 9, 2020 at 7:49 | history | asked | Q_p | CC BY-SA 4.0 |