Abstract
We prove that every smooth action a of Zk, k > 2, on the (k +1)- dimensional torus whose elements are homotopic to corresponding elements of an action a0 by hyperbolic linear maps preserves an absolutely continuous measure. This is the first known result concerning abelian groups of diffeomorphisms where existence of an invariant geometric structure is obtained fromhomotopy data. We also showthat both ergodic and geometric properties of such ameasure are very close to the corresponding properties of the Lebesgue measure with respect to the linear action a0.
| Original language | English (US) |
|---|---|
| Title of host publication | The Collected Works of Anatole Katok |
| Subtitle of host publication | In 2 Volumes |
| Publisher | World Scientific Publishing Co. |
| Pages | 2337-2360 |
| Number of pages | 24 |
| Volume | 2 |
| ISBN (Electronic) | 9789811238079 |
| ISBN (Print) | 9789811238062 |
| State | Published - Jan 1 2024 |
All Science Journal Classification (ASJC) codes
- General Mathematics
- General Engineering