Timeline for What is the correct separable Schrödinger equation in spherical coordinates?
Current License: CC BY-SA 4.0
7 events
| when toggle format | what | by | license | comment | |
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| Jun 22, 2022 at 20:03 | history | edited | Buzz♦ | CC BY-SA 4.0 |
added 13 characters in body
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| Jun 21, 2022 at 17:30 | comment | added | Souvik | U can solve radial eqn using the following method, Near r=0 the differential equation for radial part is d^2u/dx^2=l(l+1)/r^2, now let u=r^s,then putting the value of u in the diiferential eqn, we gets(s-1)=l(l+1), therefore s=l+1, and the solution is u(r)=r^(l+1) or R(r)=r^l | |
| Jun 21, 2022 at 16:30 | comment | added | Mamoun Ghazali | You will get a different equation because you have to derive $R/r$ twice. you can take a look at a laplacian equation. | |
| Jun 21, 2022 at 16:23 | comment | added | Souvik | Generally the angular and azimuthal parts are solved first and then radial but u can do either. | |
| Jun 21, 2022 at 16:09 | comment | added | Mamoun Ghazali | Firstly I need to find radial, angular and azimuthal parts, then solve them. | |
| S Jun 21, 2022 at 16:03 | review | First answers | |||
| Jun 21, 2022 at 16:48 | |||||
| S Jun 21, 2022 at 16:03 | history | answered | Souvik | CC BY-SA 4.0 |