In this paper, we extend a result of Kesten and Spitzer (1979). Let us consider a stationary sequence $(\xi_k:=f(T^k(.)))_k$ given by an invertible probability dynamical system and some centered function $f$. Let $(S_n)_n$ be a simple symmetric random walk on $Z$ independent of $(\xi_k)_k$. We give examples of partially hyperbolic dynamical systems and of functions $f$ such that $n^{-3/4}(\xi(S_1)+...+\xi(S_k))$ converges in distribution as $n$ goes to infinity.