Tail index estimation for dependent data
成果类型:
Article
署名作者:
Resnick, S; Starica, C
署名单位:
Cornell University; University of Pennsylvania
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
发表日期:
1998
页码:
1156-1183
关键词:
regular variation
hill estimator
difference
摘要:
A popular estimator of the index of regular variation in heavy-tailed models is Hill's estimator. We discuss the consistency of estimator when it is applied to certain classes of heavy-tailed stationary processes. One class of processes discussed consists of processes which can be appropriately approximated by sequences of m-dependent, random variables and special cases of our results show the consistency of Hill's estimator for (i) infinite moving averages with heavy-tail innovations, (ii) a simple stationary bilinear model driven by heavy-tail noise variables and (iii) solutions of stochastic difference equations of the form Y-t = A(t)Y(t-1) + Z(t), -infinity < t < infinity where {(A(n), Z(n)), -infinity < n < infinity} are lid and the Z's have regularly varying tail probabilities. Another class of problems where our methods work successfully are solutions of stochastic difference equations such as the ARCH process where the process cannot be successfully approximated by m-dependent random variables. A final class of models where Hill estimator consistency is proven by our tail empirical process methods is the class of hidden semi-Markov models.