Local limit theorem for nonuniformly partially hyperbolic skew-products, and Farey sequences
arXiv:math/0703670
Abstract
We study skew-products of the form (x,Ï)\mapsto (Tx, Ï+Ï(x)) where T is a nonuniformly expanding map on a space X, preserving a (possibly singular) probability measure \tildeμ, and Ï:X\to S^1 is a C^1 function. Under mild assumptions on \tildeμand Ï, we prove that such a map is exponentially mixing, and satisfies the central and local limit theorems. These results apply to a random walk related to the Farey sequence, thereby answering a question of Guivarc'h and Raugi.
55 pages