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Torsors over affine curves part2 | Philippe Gille, Université Claude Bernard, Lyon 1
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Motivic Homotopy Theory
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- 1 Motivic Adams conjecture | Maria Yakerson, Oxford University
- 2 A^1-algebraic topology (following F. Morel) part 1 | Joseph Ayoub, Universität Zürich
- 3 A^1-algebraic topology (following F. Morel) part 2 | Joseph Ayoub, Universität Zürich
- 4 A^1-algebraic topology (following F. Morel) part 3 | Joseph Ayoub, Universität Zürich
- 5 A^1-algebraic topology (following F. Morel) part 4 | Joseph Ayoub, Universität Zürich
- 6 pt 1 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University
- 7 pt 2 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University
- 8 pt 3 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University
- 9 pt 4 A1-homotopy theory and the Weil conjectures | Kirsten Wickelgren, Duke University
- 10 Torsors over affine curves part1 | Philippe Gille, Université Claude Bernard, Lyon 1
- 11 Torsors over affine curves part2 | Philippe Gille, Université Claude Bernard, Lyon 1
- 12 Torsors over affine curves part3 | Philippe Gille, Université Claude Bernard, Lyon 1
- 13 Torsors over affine curves part4 | Philippe Gille, Université Claude Bernard, Lyon 1
- 14 Algebraic vector bundles over smooth affine varieties | Michael Hopkins, Harvard
- 15 Part 1 Chow groups | Burt Totaro, UCLA
- 16 Part 2 Chow groups | Burt Totaro, UCLA
- 17 Part 3 Chow groups | Burt Totaro, UCLA
- 18 Part 4 Chow groups | Burt Totaro, UCLA
- 19 A^1-homotopy and A^1-algebraic Topologie, part 2 I Fabien Morel, University LMU Munich
- 20 2 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia
- 21 3 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia
- 22 1 Local Systems in Arithmetic Geometry | Hélène Esnault, FU Berlin, Harvard, Copenhagen, B.Church TA
- 23 2 Arithmetic Properties of Local Systems | Hélène Esnault, Freie U Berlin, Harvard, U of Copenhagen
- 24 3 Local Systems in Arithmetic Geometry | Hélène Esnault, Freie Berlin, Harvard, U of Copenhagen
- 25 1 From matrices to motivic homotopy theory | Aravind Asok, University of Southern California (USC)
- 26 2 From matrices to motivic homotopy theory | Aravind Asok, University of Southern California (USC)
- 27 How I got into motivic homotopy theory–Contractibility and Spheres: a motivic view | Aravind Asok
- 28 Representation categories and motives part1 | Markus Spitzweck, University of Osnabrueck
- 29 Characteristic classes in stable motivic homotopy theory pt.1 | Frédéric Déglise, CNRS, ENS Lyon
- 30 Characteristic classes in stable motivic homotopy theory pt.2 | Frédéric Déglise, CNRS, ENS Lyon
- 31 Field arithmetic and the complexity of Galois cohomology, part1 | Daniel Krashen, Uof Pennsylvania
- 32 Motivic explorations in enumerative geometry, pt1 | Sabrina Pauli, Technische Universität Darmstadt
- 33 Motivic Homotopy: what's up with that? | Michael Hopkins
- 34 Field arithmetic and the complexity of Galois cohomology, part2 | Daniel Krashen, U of Pennsylvania
- 35 Motivic explorations in enumerative geometry, pt2 | Sabrina Pauli, Technische Universität Darmstadt
- 36 Characteristic classes in stable motivic homotopy theory pt.3 | Frédéric Déglise, CNRS, ENS Lyon
- 37 4 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia
- 38 1 Massey products in Galois cohomology | Alexander Merkurjev and Federico Scavia
- 39 Motivic explorations in enumerative geometry, pt3 | Sabrina Pauli, Technische Universität Darmstadt
- 40 Characteristic classes in stable motivic homotopy theory, part 4 | Frédéric Déglise, CNRS, ENS Lyon
- 41 Field arithmetic and the complexity of Galois cohomology, part3 | Daniel Krashen, U of Pennsylvania
- 42 Field arithmetic and the complexity of Galois cohomology, part4 | Daniel Krashen, U of Pennsylvania
- 43 Motivic explorations in enumerative geometry, pt4 | Sabrina Pauli, Technische Universität Darmstadt
- 44 Arithmetic properties of local systems | Tom Bachmann, Johannes Gutenberg University of Mainz
- 45 A^1-homotopy and A^1-algebraic Topologie, part 1 I Fabien Morel, University LMU Munich
- 46 Mathematical Maturity: Story vs. Craft: Why I like to lecture | Tom Garrity
- 47 The (motivic) Brouwer degree | Fabien Morel, University LMU Munich
