HIGHLIGHTS
- who: Transformation Groups and colleagues from the 5392, Germany have published the paper: The Authors (2022), in the Journal: (JOURNAL)
- what: The authors determine the symmetrizable algebraically simply connected endowed with the Kac-Peterson topology.
SUMMARY
N(g) π1 (G(Π)) ~ × C2=Z This statement holds in the symmetrizable case. While in the classical finite-dimensional Lie case, one has a topological Iwasawa decomposition G=K × A × U + with A and U + contractible, implying π1 (K) ~=π1 (G), it is currently unknown whether the corresponding Iwasawa decomposition in the general Kac-Moody . . .
If you want to have access to all the content you need to log in!
Thanks :)
If you don't have an account, you can create one here.