Codimension 2
From Mathematics
(→Schedule) |
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| − | = | + | = Introduction |
| − | = | + | |
| − | = Chow groups and Chern classes | + | = Cech cohomology and the Hodge conjecture in codim 1 |
| + | |||
| + | = Chow groups and Chern classes | ||
The classical construction of Chow groups and the Chern classes using the splitting principle. | The classical construction of Chow groups and the Chern classes using the splitting principle. | ||
| − | = Elementary algebraic K-Theory: K0 and K1 | + | = Elementary algebraic K-Theory: K0 and K1 |
Also the relation of algebraic K_0 with the gamma-filtration on K_0 ? | Also the relation of algebraic K_0 with the gamma-filtration on K_0 ? | ||
| − | = Elementary algebraic K-Theory: K2 | + | = Elementary algebraic K-Theory: K2 |
| − | = Bloch I | + | = Bloch I |
| − | = Bloch II = | + | = Bloch II |
| − | = The | + | = Bloch III: The dilogarithm |
| − | = | + | = The five term relation and K-theory |
| − | = | + | = The dilog, scissors congruences and volumes of hyperbolic spaces |
| − | = | + | = The dilog and zeta functions |
| − | + | = The dilog in physics | |
| − | + | = Mixed motives and periods | |
| + | |||
| + | Historical overview about the developments in the last 35 years... | ||
| + | Overview about mixed motives via their realizations and comparison encoding periods. | ||
| + | Explain that the dilog appears as a period. Relation of Extensions of Tate-Motives and K-theory | ||
| + | and connection with the topics discussed in the seminar. | ||
= References = | = References = | ||
