Point processes of exceedances for random walks in random sceneries

Abstract: Let ${\xi(k), k \in \mathbb{Z} }$ be a stationary sequence of random variables and let ${S_n, n \in \mathbb{N}_+ }$ be a transient random walk in the domain of attraction of a stable law. In the previous work \cite{Nicolas_Ahmad}, under conditions of type $D(u_n)$ and $D'(u_n)$ we provided a limit theorem for the maximum of the first $n$ terms of the sequence ${\xi(S_n), n \in \mathbb{N} }$. In this paper, under the same conditions we will see that, the limit of the process which counts the numbers of the exceedances of the form ${\xi(S_k)>u_n}, k\geq 1$, is a compound Poisson point process. We also deal with the so-called extremal index for the sequence ${\xi(S_n), n \in \mathbb{N} }$ and we discuss some weak mixing properties.