(Back to
the menu - click here.)
“Moduli
Spaces and Topology “
|
Date: |
Download-files: |
Time: |
|
Wednesday, 11. June 2014 |
Audio-only-Recording as MP3-File
(smallest possible size):
- Audio.mp3 (ca.33Mb) ============================================ Video-Recording for any system with MP4-support:
- Video.mp4 (ca.363Mb) |
15:15 – 16:25 |
Abstract :
I will
discuss the relationship between the classical moduli
space of Riemann surfaces and the configuration space of surfaces
smoothly
embedded in high dimensional euclidian space. The
homological structure of the latter space can be completely
determined
when the genus of the embedded surfaces tend to infinity. The configuration
space may also be defined for
manifolds
of dimension larger than two. A recent theorem of Galatius
and Randal-Williams identifies the homology of the
configuration space of certain 2d-dimensional manifolds embedded in high dimensional euclidian space, the so called
generalized
surfaces. The above results concerning homology of moduli
spaces do not give any information about the
homotopy groups, mainly because the spaces are not
simply connected. But for manifolds of dimension at least five,there is
an
alternative approach to the moduli spaces. I will end
the lecture with a brief description of joint work with Alexander
Berglund
concerning the homotopical and homological structure
of the homotopy automorphism
group of the generalized
surfaces
in terms of derivations of free Lie algebras and outer automorphisms
of free groups.
This
represents the first step in the alternative approach.
The lecture
will be as non technical as I can master.