CRC Colloquium
15:45 - 16:00 Coffee & Tea
16:00 - 17:00 Markus Land (LMU Munich)
17:00 - 17:15 Coffee & tea
17:15 - 18:15 Markus Reineke (RUB)
18:15 Reception
The talks and the coffee breaks will take place in V2-210/216, while the reception will be in M4-122/126.
Markus Land: Algebraic K-theory and chromatic homotopy theory
The stable homotopy groups of spheres are highly interesting, also from a geometric point of view (they participate in the description of the group of exotic spheres) but also very complicated to describe. From Waldhausen’s ``brave new algebra’’ point of view, they are given by the homotopy groups of the sphere spectrum, the initial commutative ring in this brave new algebra. One approach to studying these stable homotopy groups is through a filtration on the sphere spectrum called the chromatic filtration, related to the stratification of the moduli of formal groups by height. Ravenel conjectured a number of structural results about stable homotopy theory from this ``chromatic’’ point of view, all of which except for one, the telescope conjecture, have been affirmatively solved around 35 years ago.
A priori unrelated is algebraic K-theory: It is also highly interesting from many points of views, and also very complicated to compute in general. Waldhausen realised that the K-theory of rings in higher algebra (like the sphere spectrum) contain yet more geometric information and suggested to use the chromatic filtration to study the K-theory of the sphere spectrum. Ever since, the relation between algebraic K-theory and chromatic homotopy theory has been the context of number of deep results and conjectures.
Recent advances in precisely this interaction between chromatic homotopy theory and algebraic K-theory solve a number of these conjectures in the positive, and quite surprisingly, have even lead to a disproof of the telescope conjecture.
After a gentle introduction to the above, I will survey these recent advances, and how they can be used to even say something about the structure of the stable homotopy groups of spheres themselves.
Markus Reineke: From problems of linear algebra via moduli spaces and their invariants to lattice combinatorics
We discuss unsolved problems of linear algebra and how they can be encoded in moduli spaces. We then review some typical results and conjectures on invariants of such moduli spaces, resulting in potential applications to Tamari lattices.