Jacob Lurie: Finiteness and Ambidexterity in K(n)-local stable homotopy theory (Part 2) Published 2012-07-26 Download video MP4 360p Recommendations 1:00:14 Jacob Lurie: Finiteness and Ambidexterity in K(n)-local stable homotopy theory (Part 3) 1:14:00 Jacob Lurie: Finiteness and Ambidexterity in K(n)-local stable homotopy theory (Part 1) 57:55 2015 Math Panel with Donaldson, Kontsevich, Lurie, Tao, Taylor, Milner 03:38 Quantum Physics: The Intersection of Science and Spirituality 16:28 SVD Visualized, Singular Value Decomposition explained | SEE Matrix , Chapter 3 #SoME2 58:36 Jacob Lurie: Brauer Groups in Stable Homotopy Theory 47:18 Categorification of Fourier Theory 02:19 Relating Topology and Geometry - 2 Minute Math with Jacob Lurie 50:38 Abstract Algebra in Homotopy-Coherent Mathematics - Jacob Lurie 03:32 Mathematician Jacob Lurie, 2014 MacArthur Fellow 1:00:59 Lie Algebras and Homotopy Theory - Jacob Lurie 51:23 21. Eigenvalues and Eigenvectors 25:19 Jacob Lurie: 2015 Breakthrough Prize in Mathematics Symposium 1:24:12 Brauer Groups in Chromatic homotopy Theory (Jacob Lurie) 1/3 03:21 Mathematics and Philosophy of the Infinite – Joel David Hamkins 1:07:04 David Ayala: Higher categories are sheaves on manifolds 1:00:29 Jacob Lurie - Tamagawa Numbers and Nonabelian Poincare Duality, I [2013] 02:30 Breakthrough Prize in Mathematics 2014 17:36 The Discrete Fourier Transform (DFT) Similar videos 1:11:08 Jacob Lurie: Finiteness and Ambidexterity in K(n)-local stable homotopy theory (Part 4) 49:00 Chromatic homotopy theory - Jacob Lurie 1:26:35 Ambidexterity in Chromatic Homotopy 1:04:12 Calculations in multiplicative stable homotopy theory at height 2 Rezk 55:45 Brauer Groups in Chromatic homotopy Theory (Jacob Lurie) 2/3 53:10 Mike Hopkins: Equivariant dual of Morava E-theory 1:09:48 Dylan Wilson - Lichtenbaum-Quillen phenomena in chromatic homotopy theory 59:32 Kevin Costello: Supersymmetric gauge theory and derived geometry, Lecture 1 1:02:51 Conference: Periods, Shafarevich Maps & Applications: B. Bakker, UIC 03:32 How to prove that adj(kA) = K^(n-1).adj(A)? More results