English

On the Generalized Hill Process for Small Parameters and Applications

Methodology 2011-11-22 v1

Abstract

Let X1,X2,...X_{1},X_{2},... be a sequence of independent copies (s.i.c) of a real random variable (r.v.) X1X\geq 1, with distribution function dfdf F(x)=PF(x)=\mathbb{P}% (X\leq x) and let X1,nX2,n...Xn,nX_{1,n}\leq X_{2,n} \leq ... \leq X_{n,n} be the order statistics based on the n1n\geq 1 first of these observations. The following continuous generalized Hill process {equation*} T_{n}(\tau)=k^{-\tau}\sum_{j=1}^{j=k}j^{\tau}(\log X_{n-j+1,n}-\log X_{n-j,n}), \label{dl02} {equation*} τ>0\tau >0, 1kn1\leq k \leq n, has been introduced as a continuous family of estimators of the extreme value index, and largely studied for statistical purposes with asymptotic normality results restricted to τ>1/2\tau > 1/2. We extend those results to 0<τ1/20 < \tau \leq 1/2 and show that asymptotic normality is still valid for τ=1/2\tau=1/2. For 0<τ<1/20 < \tau <1/2, we get non Gaussian asymptotic laws which are closely related to the Riemann function % \zeta(s)=\sum_{n=1}^{\infty} n^{-s},s>1

Keywords

Cite

@article{arxiv.1111.4564,
  title  = {On the Generalized Hill Process for Small Parameters and Applications},
  author = {Gane Samb Lo and El Hadji Deme and Aliou Diop},
  journal= {arXiv preprint arXiv:1111.4564},
  year   = {2011}
}

Comments

19 pages; 4 figures

R2 v1 2026-06-21T19:38:31.877Z