Decoupling in harmonic analysis and the Vinogradov mean value theorem - Bourgain
Decoupling in harmonic analysis and applications to number theory - Jean Bourgain
Larry Guth: Reflections on the proof(s) of the Vinogradov mean value conjecture (NTWS 114)
W22 SASMS I - "How to Prove Vinogradov's Mean Value Theorem"
Jaume de Dios - Decoupling and applications: from PDEs to Number Theory.
An introduction to Vinogradov's mean value theorem
Ciprian Demeter: Decoupling theorems and their applications
Jean Bourgain - Decoupling in harmonic analysis and applications to PDE and number theory
Larry Guth (MIT) - 2/3 Ingredients of the proof of decoupling [MSRI 2017]
Larry Guth, Introduction to decoupling
[BOURBAKI 2017] 17/06/2017 - 2/4 - Lillian PIERCE
8th PRCM: Zane Li, Connections between decoupling and efficient congruencing
Vinogradov's mean-value theorem Top #6 Facts
Kevin Hughes: What to do after Vinogradov’s Mean ValueTheorems?
Larry Guth - Introduction to decoupling in Fourier analysis
Decouplings and Applications: A Journey from Continuous to Discrete - Ciprian Demeter
Decouplings and applications – Ciprian Demeter – ICM2018
Vinogradov's Three Primes Theorem with Primes from Special Sets
Chebycheff's theorem
2017 Breakthrough Prize in Mathematics awarded to Jean Bourgain
![Larry Guth (MIT) - 2/3 Ingredients of the proof of decoupling [MSRI 2017]](https://img.youtube.com/vi/Ef245ds7RMQ/0.jpg)
![[BOURBAKI 2017] 17/06/2017 - 2/4 - Lillian PIERCE](https://img.youtube.com/vi/u2b64UbYHyc/0.jpg)
