L-functions in the theory of numbers by Ritabrata Munshi
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- čas přidán 1. 07. 2014
- L-functions were introduced by Dirichlet to study
the distribution of prime numbers in arithmetic progression.
Later Riemann extended the definition of these functions
and chalked down a program to settle the famous problem of Gauss- the Prime Number Theorem. The main hypothesis of Riemann still remains open. The relevance of L-functions and the
Riemann hypothesis in modern Mathematics can hardly be undermined.
The focus of the talk will be to explain the ideas behind
L-functions and their present status in Number Theory.
Just started listening to Ritabrata Munshi lecture. Spell bounded! So clear delivery and well presented! Congratulations Ritabrata! We need more people like you to get ordinary folks (and retired like me) to get fired up on the beauty of mathematics.🎈🎈
I really love this, precise and accurate.
Most videos I see like this often skip over important steps. But this covers everything :).
Wonderful, thank you❤
so great, very clear
Fantastic lecture!
great one
Proud of you as a bengali
Upto 58:50 I understood most of the stuff there after didn't get anything.
21:34
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❤
Da por sabido que la la función seta es igual al producto de Euler: la matemática no supone nada, demuestra. En este caso es importante la divergencia de la serie de los números primos, la cual no demuestra y es algo delicado
ASMR styleee.
Princeton graduate????
His unnecessary movement is very distractive!
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