Completed
Sarah Harrison | Liouville Theory and Weil-Petersson Geometry
Class Central Classrooms beta
YouTube videos curated by Class Central.
Classroom Contents
Arithmetic Quantum Field Theory Conference
Automatically move to the next video in the Classroom when playback concludes
- 1 Melanie Matchett Wood | Statistics of Number fields, function fields, and 3-manifolds
- 2 Charlotte Chan | Generic character sheaves on parahoric subgroups
- 3 Kim Klinger–Logan | Connections between special values of L-functions and scattering amplitudes
- 4 Fei Yan | Topological defects on the lattice
- 5 Sarah Harrison | Liouville Theory and Weil-Petersson Geometry
- 6 Roman Bezrukavnikov | From affine Hecke category to invariant distributions
- 7 Sasha Braverman | Hecke operators for algebraic curves over local non-archimedian fields
- 8 Peng Shan | Modularity for W-algebras, affine Springer fibres and associated variety
- 9 Bảo Châu Ngô | On the nonabelian Fourier kernel and the Lafforgue transform
- 10 YoungJu Choie | Schubert Eisenstein series and Poisson summation for Schubert varieties
- 11 Axel Kleinschmidt | Automorphic representations in string amplitudes
- 12 Pavel Etingof | Analytic Langlands correspondence over C and R
- 13 Davide Gaiotto | Unexpected Unitarity
- 14 Spencer Leslie | Relative Langlands and endoscopy
- 15 Anne Marie Aubert | Local Langlands correspondence:from extended quotients to affine Hecke algebras
- 16 Kobi Kremnitzer | Functional analysis over the integers, L-functions and global Hodge theory
- 17 David Nadler | Going to the boundary
- 18 George Pappas | Finite and p-adic Chern-Simons type invariants
- 19 Sam Raskin | The geometric Langlands conjecture
- 20 Alejandra Castro | The light we can see: Extracting black holes from weak Jacobi forms
- 21 Zhiwei Yun | Theta correspondence and relative Langlands
