Timeline for Bessel and Neumann functions:ordering the zeroes
Current License: CC BY-SA 3.0
11 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Oct 8, 2013 at 15:54 | vote | accept | Olga | ||
| Oct 8, 2013 at 15:54 | comment | added | Olga | Michael, thank you for the remark on the surname. I corrected it.) | |
| Oct 8, 2013 at 15:53 | history | edited | Olga | CC BY-SA 3.0 |
edited title
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| Oct 8, 2013 at 15:21 | comment | added | Michael Renardy | Your question is an example of the funny things that happen when names get transliterated to Russian and back again. The name is Neumann. | |
| Oct 8, 2013 at 14:20 | answer | added | username | timeline score: 1 | |
| Oct 7, 2013 at 18:51 | comment | added | username | The old version Abramowitz & Stegun is unaffected by the US Goverment Shutdown ;) | |
| Oct 7, 2013 at 11:38 | comment | added | Olga | This is what I want, thank you very much. Although I can not access the site you are referring to. | |
| Sep 28, 2013 at 18:35 | comment | added | username | Formula 10.21.3 tells you that there is exacty one zero of $Y_k$ between two zeros of $J_k$, and if you forget the origin, the $n$-th zero of $Y_k$ is before the $n$-th positive zero of $J_k$. | |
| Sep 27, 2013 at 10:11 | comment | added | Olga | I just would like to establish the frequencies in an icreasing order, and the frequencies are connected to the zeroes of Bessel and Neuman functions. Everything is fixed, $k$ is fixed, $\lambda$ is fixed, we still have $2$ countable sets of zeroes of $J_k$ and $Y_k$. | |
| Sep 24, 2013 at 10:47 | comment | added | username | Could you clarify your question? Are you interested in sequences w.r.t. $k$ with $\lambda$ fixed, or w.r.t. $\lambda$ with $k$ fixed?. It seems that you have two parameters. Explain perhaps in what sense the question is reduced to ordering zeroes of $J_k$ and $Y_k$. | |
| Oct 12, 2012 at 9:42 | history | asked | Olga | CC BY-SA 3.0 |
