Conditions for the convergence in distribution of stationary normal processes
Leadbetter, M. Ross ; Lindgren, Georg LU
and Rootzén, Holger
(1978)
In Stochastic Processes and their Applications
8(2).
p.131-139
- Abstract
- The asymptotic distribution of the maximum Mn=max1=<t=<nξt in a stationary normal sequence ξ1,ξ,... depends on the correlation rt between ξ0 and ξt. It is well known that if rt log t -> 0 as t -> ~ or if Σr2t<~, then the limiting distribution is the same as for a sequence of independent normal variables. Here it is shown that this also follows from a weaker condition, which only puts a restriction on the number of t-values for which rt log t islarge. The condition gives some insight into what is essential for this asymptotic behaviour of maxima. Similar results are obtained for a stationary normal process in continuous time.
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/1273157
- author
- Leadbetter, M. Ross
; Lindgren, Georg
LU
and Rootzén, Holger
- publishing date
- 1978
- type
- Contribution to journal
- publication status
- published
- subject
- keywords
- [Mathematical Subject Codes] Primary 60G15, [Mathematical Subject Codes] 60G10, [Mathematical Subject Codes] Stationary normal sequences, [Mathematical Subject Codes] Stationary normal processes, [Mathematical Subject Codes] Limit distribution for maxima
- in
- Stochastic Processes and their Applications
- volume
- 8
- issue
- 2
- pages
- 131 - 139
- publisher
- Elsevier
- ISSN
- 1879-209X
- language
- English
- LU publication?
- no
- id
- 88e5c7a8-0356-4cbd-9d95-35fa89ac9d80 (old id 1273157)
- alternative location
- http://ida.lub.lu.se/cgi-bin/elsevier_local?YMT00110-A-03044149-V0008I02-78900029
- date added to LUP
- 2016-04-01 15:31:16
- date last changed
- 2019-03-08 03:04:30
@article{88e5c7a8-0356-4cbd-9d95-35fa89ac9d80,
abstract = {{The asymptotic distribution of the maximum Mn=max1=<t=<nξt in a stationary normal sequence ξ1,ξ,... depends on the correlation rt between ξ0 and ξt. It is well known that if rt log t -> 0 as t -> ~ or if Σr2t<~, then the limiting distribution is the same as for a sequence of independent normal variables. Here it is shown that this also follows from a weaker condition, which only puts a restriction on the number of t-values for which rt log t islarge. The condition gives some insight into what is essential for this asymptotic behaviour of maxima. Similar results are obtained for a stationary normal process in continuous time.}},
author = {{Leadbetter, M. Ross and Lindgren, Georg and Rootzén, Holger}},
issn = {{1879-209X}},
keywords = {{[Mathematical Subject Codes] Primary 60G15; [Mathematical Subject Codes] 60G10; [Mathematical Subject Codes] Stationary normal sequences; [Mathematical Subject Codes] Stationary normal processes; [Mathematical Subject Codes] Limit distribution for maxima}},
language = {{eng}},
number = {{2}},
pages = {{131--139}},
publisher = {{Elsevier}},
series = {{Stochastic Processes and their Applications}},
title = {{Conditions for the convergence in distribution of stationary normal processes}},
url = {{http://ida.lub.lu.se/cgi-bin/elsevier_local?YMT00110-A-03044149-V0008I02-78900029}},
volume = {{8}},
year = {{1978}},
}