Billiards and Moduli Spaces - Curtis McMullen
Manifolds in Maryland
Billiards and Moduli Spaces - Curtis McMullen
1:04:24
Entropy: From Algebraic Integers to Dynamics on Surfaces - Curtis McMullen
Manifolds in Maryland
Entropy: From Algebraic Integers to Dynamics on Surfaces - Curtis McMullen
1:09:13
Breaking the Enigma Code - Zbigniew Blocki
Manifolds in Maryland
Breaking the Enigma Code - Zbigniew Blocki
56:23
Scott Wolpert on not hearing the shape of the drum
Manifolds in Maryland
Scott Wolpert on not hearing the shape of the drum
2:39
Scott Wolpert's advice to young geometers
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Scott Wolpert's advice to young geometers
0:58
Beneath the Surface - interview with Scott Wolpert
Manifolds in Maryland
Beneath the Surface - interview with Scott Wolpert
17:30
Visualizing Conic Sections Using Blender and Desmos
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Visualizing Conic Sections Using Blender and Desmos
17:05
Rotations in 3D Graphics With Quaternions
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Rotations in 3D Graphics With Quaternions
8:23
Geometry With Compass and Straightedge
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Geometry With Compass and Straightedge
24:35
Using Voronoi Diagrams In Computer Graphics
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Using Voronoi Diagrams In Computer Graphics
11:11
Normal Vectors and Their Applications in Computer Graphics
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Normal Vectors and Their Applications in Computer Graphics
12:36
Euler's formula and spherical geometry
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Euler's formula and spherical geometry
20:10
The Bergman kernel of the polydisk and the ball
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The Bergman kernel of the polydisk and the ball
8:25
What is the Bergman kernel?
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What is the Bergman kernel?
17:18
Lie derivatives of differential forms
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Lie derivatives of differential forms
19:52
Poincare recurrence
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Poincare recurrence
13:08
Liouville's Theorem through Symplectic Geometry
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Liouville's Theorem through Symplectic Geometry
13:37
Duality in Optimal Transport
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Duality in Optimal Transport
11:05
Optimal Transport (According to Leonid Kantorovich)
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Optimal Transport (According to Leonid Kantorovich)
14:20
Optimal Transport (according to Gaspard Monge)
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Optimal Transport (according to Gaspard Monge)
18:00
Domains of holomorphy and Dolbeault cohomology
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Domains of holomorphy and Dolbeault cohomology
21:25
The Cartan-Thullen theorem
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The Cartan-Thullen theorem
22:44
What are domains of holomorphy?
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What are domains of holomorphy?
20:44
Analytic continuation in higher dimensions
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Analytic continuation in higher dimensions
29:12
The Cobordism Exhibition
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The Cobordism Exhibition
22:34
The Nakano vanishing theorem for positive line bundles
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The Nakano vanishing theorem for positive line bundles
19:49
What is the Chern connection?
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What is the Chern connection?
26:45
An exactness theorem in Hilbert spaces: the Hormander technique
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An exactness theorem in Hilbert spaces: the Hormander technique
28:31
Unbounded operators between Hilbert spaces, Von Neumann's theorem on the adjoint
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Unbounded operators between Hilbert spaces, Von Neumann's theorem on the adjoint
26:09
The Kodaira embedding theorem
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The Kodaira embedding theorem
20:21
Positive line bundles
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Positive line bundles
17:39
Kahler-Einstein metrics
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Kahler-Einstein metrics
14:13
Hodge theory on Kahler manifolds
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Hodge theory on Kahler manifolds
24:54
What is Hodge theory?
Manifolds in Maryland
What is Hodge theory?
25:56