- Series
- CDSNS Colloquium
- Time
- Monday, February 27, 2012 - 11:05am for 1 hour (actually 50 minutes)
- Location
- Skiles 006
- Speaker
- Andrew Torok – Univ. of Houston
- Organizer
- Rafael de la Llave
Consider a hyperbolic basic set of a smooth diffeomorphism. We are
interested in the transitivity of Holder skew-extensions with fiber a
non-compact connected Lie group.
In the case of compact fibers, the transitive extensions contain an open
and dense set. For the non-compact case, we conjectured that this is still
true within the set of extensions that avoid the obvious obstructions to
transitivity. Within this class of cocycles, we proved generic transitivity
for extensions with fiber the special Euclidean group SE(2n+1) (the case
SE(2n) was known earlier), general Euclidean-type groups, and some
nilpotent groups.
We will discuss the "correct" result for extensions by the Heisenberg
group: if the induced extension into its abelinization is transitive, then
so is the original extension. Based on earlier results, this implies the
conjecture for Heisenberg groups. The results for nilpotent groups involve
questions about Diophantine approximations.
This is joint work with Ian Melbourne and Viorel Nitica.