Abstract
We consider C2 families t → ft of C4 unimodal maps ft whose critical point is slowly recurrent, and we show that the unique absolutely continuous invariant measure μt of ft depends differentiably on t, as a distribution of order 1. The proof uses transfer operators on towers whose level boundaries are mollified via smooth cutoff functions, in order to avoid artificial discontinuities. We give a new representation of μt for a Benedicks-Carleson map ft, in terms of a single smooth function and the inverse branches of ft along the postcritical orbit. Along the way, we prove that the twisted cohomological equation v = α f - f'α has a continuous solution, if f is Benedicks-Carleson and v is horizontal for f.
| Originalsprog | Engelsk |
|---|---|
| Tidsskrift | Annales Scientifiques de l'Ecole Normale Superieure |
| Vol/bind | 45 |
| Udgave nummer | 6 |
| Sider (fra-til) | 861-926 |
| ISSN | 0012-9593 |
| Status | Udgivet - 2012 |