50:11

Knotty knits A chat about math and crafts | Knotty knits: a chat about math and crafts

53:16

Mathematical Maturity: Story vs. Craft: Why I like to lecture | Tom Garrity

51:30

A^1-homotopy and A^1-algebraic Topologie, part 1 I Fabien Morel, University LMU Munich

58:29

Arithmetic properties of local systems | Tom Bachmann, Johannes Gutenberg University of Mainz

01:03:08

Motivic explorations in enumerative geometry, pt4 | Sabrina Pauli, Technische Universität Darmstadt

01:01:45

Field arithmetic and the complexity of Galois cohomology, part4 | Daniel Krashen, U of Pennsylvania

01:02:49

Field arithmetic and the complexity of Galois cohomology, part3 | Daniel Krashen, U of Pennsylvania

01:03:16

Characteristic classes in stable motivic homotopy theory, part 4 | Frédéric Déglise, CNRS, ENS Lyon

01:02:46

Motivic explorations in enumerative geometry, pt3 | Sabrina Pauli, Technische Universität Darmstadt

55:27

1 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia

59:20

4 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia

01:03:08

Characteristic classes in stable motivic homotopy theory pt.3 | Frédéric Déglise, CNRS, ENS Lyon

59:24

Motivic explorations in enumerative geometry, pt2 | Sabrina Pauli, Technische Universität Darmstadt

59:23

Field arithmetic and the complexity of Galois cohomology, part2 | Daniel Krashen, U of Pennsylvania

59:24

Motivic Homotopy: what's up with that? | Michael Hopkins

55:58

Motivic explorations in enumerative geometry, pt1 | Sabrina Pauli, Technische Universität Darmstadt

01:03:46

Characteristic classes in stable motivic homotopy theory pt.2 | Frédéric Déglise, CNRS, ENS Lyon

01:02:25

How I got into motivic homotopy theory–Contractibility and Spheres: a motivic view | Aravind Asok

59:28

Field arithmetic and the complexity of Galois cohomology, part1 | Daniel Krashen, Uof Pennsylvania

01:03:54

Characteristic classes in stable motivic homotopy theory pt.1 | Frédéric Déglise, CNRS, ENS Lyon

01:01:29

A^1-homotopy and A^1-algebraic Topologie, part 2 I Fabien Morel, University LMU Munich

01:01:40

Representation categories and motives part1 | Markus Spitzweck, University of Osnabrueck

59:55

Motivic Adams conjecture | Maria Yakerson, Oxford University

58:34

A^1-algebraic topology (following F. Morel) part 4 | Joseph Ayoub, Universität Zürich

01:03:01

pt 4 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University

49:34

Geometry with Seam Allowance | Irena Swanson, Purdue University

56:31

Torsors over affine curves part4 | Philippe Gille, Université Claude Bernard, Lyon 1

01:05:53

A^1-algebraic topology (following F. Morel) part 3 | Joseph Ayoub, Universität Zürich

01:01:52

pt 3 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University

58:32

Torsors over affine curves part3 | Philippe Gille, Université Claude Bernard, Lyon 1

01:05:17

A^1-algebraic topology (following F. Morel) part 2 | Joseph Ayoub, Universität Zürich

01:00:21

pt 2 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University

01:33:56

A^1-algebraic topology (following F. Morel) part 1 | Joseph Ayoub, Universität Zürich

01:01:20

Torsors over affine curves part2 | Philippe Gille, Université Claude Bernard, Lyon 1

01:01:51

The (motivic) Brouwer degree | Fabien Morel, University LMU Munich

57:26

pt 1 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University

01:01:20

Torsors over affine curves part1 | Philippe Gille, Université Claude Bernard, Lyon 1

01:04:07

2 From matrices to motivic homotopy theory | Aravind Asok, University of Southern California (USC)

01:01:01

Algebraic vector bundles over smooth affine varieties | Michael Hopkins, Harvard

51:50

Henry Segerman | Artistic mathematics: Truth and Beauty

59:21

A-upper motives | Nikita Karpenko (University of Alberta)

57:12

Part 4 Chow groups | Burt Totaro, UCLA

01:00:52

3 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia

45:12

3 Local Systems in Arithmetic Geometry | Hélène Esnault, Freie Berlin, Harvard, U of Copenhagen

01:01:11

Part 3 Chow groups | Burt Totaro, UCLA

55:24

2 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia

49:59

2 Arithmetic Properties of Local Systems | Hélène Esnault, Freie U Berlin, Harvard, U of Copenhagen

01:03:04

Part 2 Chow groups | Burt Totaro, UCLA

54:14

1 Local Systems in Arithmetic Geometry | Hélène Esnault, FU Berlin, Harvard, Copenhagen, B.Church TA

57:57

Part 1 Chow groups | Burt Totaro, UCLA

57:46

1 From matrices to motivic homotopy theory | Aravind Asok, University of Southern California (USC)

01:02:21

Part 2 On the theory of near-term quantum advantage | Bill Fefferman (The University of Chicago)

58:51

Part 5 Algorithmic dual to the adversary method: Quantum query complexity | Yassine Hamoudi

55:20

Part 2 The polynomial method: Quantum query complexity | Yassine Hamoudi (U California Berkeley)

59:41

Part 3 Quantum-inspired algorithms: sketching and beyond | Ewin Tang (University of Washington)

01:06:26

Part 4 Transversal gates: Topological aspects of quantum codes | Jeongwan Haah (Microsoft Research)

01:00:58

Part 5 Stoquastic Hamiltonians | Sandy Irani (University of California, Irvine)

01:05:30

Part 5 On the theory of near-term quantum advantage | Bill Fefferman (The University of Chicago)

56:03

Part 3 Circuit complexity of code states | Jeongwan Haah (Microsoft Research)

01:06:34

Part 4 On the theory of near-term quantum advantage | Bill Fefferman (The University of Chicago)