Timeline for Does there exist an upper bound on the Fourier coefficients of the reciprocal theta function $\frac {1}{\theta}$?
Current License: CC BY-SA 4.0
8 events
| when toggle format | what | by | license | comment | |
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| May 21, 2021 at 9:28 | vote | accept | J. Swail | ||
| May 20, 2021 at 14:01 | answer | added | r_l | timeline score: 7 | |
| May 15, 2021 at 19:02 | history | edited | Matthieu Romagny | CC BY-SA 4.0 |
edited title
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| May 15, 2021 at 18:53 | answer | added | მამუკა ჯიბლაძე | timeline score: 6 | |
| May 14, 2021 at 21:59 | comment | added | Nagaraj Iyengar | Please refer to A Characterization in the space of Convolution Operators- B.R.Nagaraj,Proc.AMS,Vol.94,July(1985) | |
| May 14, 2021 at 17:51 | comment | added | Terry Tao | Your best bet would be to analytically or meromorphically continue $1/\theta(x)$ into a strip around the real axis and shift the contour of integration for the Fourier coefficients to either the upper half-plane or lower half-plane, depending on whether the frequency $n$ is positive or negative (i.e., use the saddle point method). | |
| May 14, 2021 at 16:17 | history | edited | J. Swail | CC BY-SA 4.0 |
added 1 character in body
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| May 14, 2021 at 14:31 | history | asked | J. Swail | CC BY-SA 4.0 |