Terence Tao (UCLA) / The Erdős discrepancy problem / 2017-06-15 Published 2017-08-15 Download video MP4 360p Recommendations 53:33 The hardest "What comes next?" (Euler's pentagonal formula) 15:25 The Subtle Reason Taylor Series Work | Smooth vs. Analytic Functions 19:22 Using topology for discrete problems | The Borsuk-Ulam theorem and stolen necklaces 48:51 15. Projections onto Subspaces 50:05 6. Monte Carlo Simulation 28:47 Episode 3: Derivatives - The Mechanical Universe 18:38 Navigating an Infinitely Dense Minefield | Why Measure Infinity? 28:23 The Fast Fourier Transform (FFT): Most Ingenious Algorithm Ever? 48:05 4. Factorization into A = LU 30:42 Pi hiding in prime regularities 1:25:25 16. Complexity: P, NP, NP-completeness, Reductions 15:05 Variational Autoencoders 18:16 Who cares about topology? (Inscribed rectangle problem) 47:20 8. Solving Ax = b: Row Reduced Form R 16:28 SVD Visualized, Singular Value Decomposition explained | SEE Matrix , Chapter 3 #SoME2 40:45 Complex integration, Cauchy and residue theorems | Essence of Complex Analysis #6 49:48 14. Orthogonal Vectors and Subspaces 51:23 21. Eigenvalues and Eigenvectors 21:57 What is Lie theory? Here is the big picture. | Lie groups, algebras, brackets #3 Similar videos 53:39 Terence Tao - The Erdős discrepancy problem [2017] 51:49 Terence Tao: The Erdős Discrepancy Problem 58:44 Terence Tao: An integration approach to the Toeplitz square peg problem 50:34 The Erdos discrepancy problem - צילום הרצאות סטודיו האנה בי 59:21 Terence Tao (UCLA) / Finite time blowup constructions for supercritical equations /2017-06-16 11:13 The Test That Terence Tao Aced at Age 7 01:26 My Formula For The Erdos Discrepancy Problem!!! 1:03:15 Terence Tao (UCLA): Pseudorandomness of the Liouville function 01:01 Terence Tao, Greatest Mathematician 52:24 Can the Navier-Stokes Equations Blow Up in Finite Time? | Prof. Terence Tao 01:07 Terrence Tao 00:35 Education & Research Award Finalist 2022 | Professor Terence Tao 49:18 Terence Tao - Large and Small Gaps in the Primes [2015] 52:16 Hardy-Littlewood and Chowla Type Conjectures in the Presence of a Siegel Zero - Terence Tao 33:26 Terry Tao (1.1) Universality for random matrix ensembles of Wigner type, part 1.1 More results