Timeline for Roadmap to understand the Scholze's proof of the local Langlands correspondence for $\text{GL}_n$ over $p$-adic fields
Current License: CC BY-SA 4.0
6 events
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| Jul 3, 2022 at 10:35 | comment | added | Maty Mangoo | @user860322 I can maybe add just an advise for the future: - certain things in Maths have their 'natural order', but also - every individual has its own way to learn. What I want to say with the previous is that.. you have to find by yourself what is the best way to learn new things. But in my opinion, things should be explained in their natural order, such that the approach and the appearing objects make sense. Take a look here math.stackexchange.com/questions/48981/… , I very much agree with the answer, but well.. it is just my opinion. | |
| Jul 3, 2022 at 10:20 | comment | added | Maty Mangoo | @user860322 Ok, maybe first of all, what I told you is about the "local Langlands Correspondence". This is just a part of the Langlands Program. If you wish to learn about the Langlands Program, there is a book of Kudla, Cogdell and co. called "An Introduction to the Langlands Program", see here: amazon.com/Introduction-Langlands-Program-Joseph-Bernstein/dp/… . On the one hand, it is "very short" (relative to what a solid introduction would really need), but on the other hand, it may not be the best literature for beginners. | |
| Jul 2, 2022 at 15:03 | comment | added | user860322 | Thank you very much! Could you recommend complementary books for those who wish to learn more about the Langlands Program? | |
| Jul 2, 2022 at 15:00 | vote | accept | user860322 | ||
| S Jul 1, 2022 at 14:11 | review | First answers | |||
| Jul 1, 2022 at 14:22 | |||||
| S Jul 1, 2022 at 14:11 | history | answered | Maty Mangoo | CC BY-SA 4.0 |