Timeline for Graphs from the point of view of Riemann surfaces
Current License: CC BY-SA 4.0
10 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Nov 26, 2021 at 6:07 | comment | added | Lokenath Kundu | I am grateful to every professor who is trying to help me in every possible way. Actually, I am Riemann Surface, Branched coverings, and the growth of groups. I was listening to the lectures by Prof. Mednykh. I am trying to understand the discrete version of the Riemann surface theory. This is the link to the slides math.nsc.ru/conference/g2/g2r2/files/pdf/Lecture-8.pdf. Any kind of help related to the discrete version of the Riemann surface is highly appreciated. Thank you in advance | |
| Nov 23, 2021 at 6:38 | comment | added | Jacob Bond | I believe this is the "correct" answer, in the sense that this book gives a broad overview of the field Mednykh seems to typically work in, e.g. sciencedirect.com/science/article/pii/S0195669803001379 | |
| Nov 22, 2021 at 23:42 | comment | added | Tom Copeland | @LokenathKundu, thks for the Q--has motivated the compilation of good references. | |
| Nov 22, 2021 at 19:14 | comment | added | Lokenath Kundu | Thank you very much, everyone. | |
| Nov 22, 2021 at 18:59 | comment | added | Roland Bacher | I agree with you. | |
| Nov 22, 2021 at 18:50 | comment | added | Tom Copeland | And graph theory pops up everywhere. In any event, it's an interesting book on such topics that might be of interest to others browsing the question. | |
| Nov 22, 2021 at 18:40 | comment | added | Roland Bacher | Neither could I but Mednykh seems to have papers on this 'toy-model' stuff. | |
| Nov 22, 2021 at 17:09 | comment | added | Tom Copeland | @RolandBacher: Couldn't quickly find the lecture the OP mentioned, so I'm not sure precisely what he is looking for. | |
| Nov 22, 2021 at 17:04 | comment | added | Roland Bacher | I interpreted the original question differently: There is quite an activity around graphs as a sort of 'toy models" for Riemann surfaces. They are thus not considered as embedded in Riemann surfaces (the topic of the book, I guess) but as sort of 'trivial analogues'. | |
| Nov 22, 2021 at 16:11 | history | answered | Tom Copeland | CC BY-SA 4.0 |