Timeline for Asymptotic $\int_M \mathrm{exp}[\mathbf{e}\left(n -\frac{t}{2\pi i}\right)] \left( 1 + \frac{5}{6} \mathbf{e}^2 \right)^{1/2} $ on quintic Calabi-Yau
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Aug 28, 2015 at 11:13 | vote | accept | john mangual | ||
| Aug 27, 2015 at 22:04 | answer | added | Lazzaro Campeotti | timeline score: 10 | |
| Aug 27, 2015 at 18:45 | comment | added | Paul Reynolds | I got something nearly identical to the RHS by just expanding the integrand as suggested, and I probably made a small mistake somewhere. Given that your manifold is Calabi-Yau, an example of such an $\mathbf{e}$ is a multiple of the Kahler form itself, that's how you're assured there is one. | |
| Aug 27, 2015 at 18:17 | history | edited | john mangual | CC BY-SA 3.0 |
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| Aug 27, 2015 at 15:18 | comment | added | Liviu Nicolaescu | What is the meaning of $(1+\frac{5}{6}\mathbf{e}^2)^{1/2}$? | |
| Aug 27, 2015 at 15:16 | comment | added | Liviu Nicolaescu | I fixed a TeX typo. The math content is unchanged. | |
| Aug 27, 2015 at 15:15 | history | edited | Liviu Nicolaescu | CC BY-SA 3.0 |
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| Aug 27, 2015 at 12:51 | comment | added | Lazzaro Campeotti | It looks like you just expand out the integrand as a power series in $\mathbf e$, set $\mathbf e^3=5$ and kill everything else. Am I missing something? | |
| Aug 27, 2015 at 10:39 | history | asked | john mangual | CC BY-SA 3.0 |