Talk by Paul Frigge
Date: 25.01.21 Time: 15.00 - 16.15 Room: Y27H28
In the setting of finitely smooth circle diffeomorphisms, the renormalization operator is not differentiable. In this lecture, I will discuss generalizable methods and techniques which allow us to prove that the topological classes of C^{4+ epsilon} circle diffeomorphisms with irrational rotation number of bounded combinatorial type are C^1 global smooth stable manifolds of renormalization. First I will explain how to extend renormalization to decomposition spaces, and construct a normed space of Mobius-Schwarzian decompositions on which the renormalization operator is jump-out hyperbolic. Using this notion, I will explain the construction of the local smooth stable manifolds in a neighborhood of the rigid rotations. This structure will then be globalized with the help of monotone families which transversely intersect the topological classes.