Loading [MathJax]/extensions/tex2jax.js

Statistical Aspects of Perpetuities

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autorschaft

  • Rudolf Grübel
  • Susan M. Pitts

Organisationseinheiten

Externe Organisationen

  • University of Cambridge

Details

OriginalspracheEnglisch
Seiten (von - bis)143-162
Seitenumfang20
FachzeitschriftJournal of Multivariate Analysis
Jahrgang75
Ausgabenummer1
PublikationsstatusVeröffentlicht - Okt. 2000

Abstract

For a distribution μ on the unit interval we define the associated perpetuity Ψ(μ) as the distribution of 1+X1+X1X2+X1X2X 3+..., where (Xn)n∈N is a sequence of independent random variables with distribution μ. Such quantities arise in insurance mathematics and in many other areas. We prove the differentiability of the perpetuity functionalψ with respect to integral and supremum norms. These results are then used to investigate the statistical properties of empirical perpetuities, including the behaviour of bootstrap confidence regions.

ASJC Scopus Sachgebiete

Zitieren

Statistical Aspects of Perpetuities. / Grübel, Rudolf; Pitts, Susan M.
in: Journal of Multivariate Analysis, Jahrgang 75, Nr. 1, 10.2000, S. 143-162.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Grübel R, Pitts SM. Statistical Aspects of Perpetuities. Journal of Multivariate Analysis. 2000 Okt;75(1):143-162. doi: 10.1006/jmva.1999.1890
Grübel, Rudolf ; Pitts, Susan M. / Statistical Aspects of Perpetuities. in: Journal of Multivariate Analysis. 2000 ; Jahrgang 75, Nr. 1. S. 143-162.
Download
@article{99299d2ac9a54c8091c73c738f3de3e8,
title = "Statistical Aspects of Perpetuities",
abstract = "For a distribution μ on the unit interval we define the associated perpetuity Ψ(μ) as the distribution of 1+X1+X1X2+X1X2X 3+..., where (Xn)n∈N is a sequence of independent random variables with distribution μ. Such quantities arise in insurance mathematics and in many other areas. We prove the differentiability of the perpetuity functionalψ with respect to integral and supremum norms. These results are then used to investigate the statistical properties of empirical perpetuities, including the behaviour of bootstrap confidence regions.",
keywords = "Asymptotic normality, Bootstrap, Empirical perpetuities, Perpetual annuity",
author = "Rudolf Gr{\"u}bel and Pitts, {Susan M.}",
year = "2000",
month = oct,
doi = "10.1006/jmva.1999.1890",
language = "English",
volume = "75",
pages = "143--162",
journal = "Journal of Multivariate Analysis",
issn = "0047-259X",
publisher = "Academic Press Inc.",
number = "1",

}

Download

TY - JOUR

T1 - Statistical Aspects of Perpetuities

AU - Grübel, Rudolf

AU - Pitts, Susan M.

PY - 2000/10

Y1 - 2000/10

N2 - For a distribution μ on the unit interval we define the associated perpetuity Ψ(μ) as the distribution of 1+X1+X1X2+X1X2X 3+..., where (Xn)n∈N is a sequence of independent random variables with distribution μ. Such quantities arise in insurance mathematics and in many other areas. We prove the differentiability of the perpetuity functionalψ with respect to integral and supremum norms. These results are then used to investigate the statistical properties of empirical perpetuities, including the behaviour of bootstrap confidence regions.

AB - For a distribution μ on the unit interval we define the associated perpetuity Ψ(μ) as the distribution of 1+X1+X1X2+X1X2X 3+..., where (Xn)n∈N is a sequence of independent random variables with distribution μ. Such quantities arise in insurance mathematics and in many other areas. We prove the differentiability of the perpetuity functionalψ with respect to integral and supremum norms. These results are then used to investigate the statistical properties of empirical perpetuities, including the behaviour of bootstrap confidence regions.

KW - Asymptotic normality

KW - Bootstrap

KW - Empirical perpetuities

KW - Perpetual annuity

UR - http://www.scopus.com/inward/record.url?scp=0042494540&partnerID=8YFLogxK

U2 - 10.1006/jmva.1999.1890

DO - 10.1006/jmva.1999.1890

M3 - Article

AN - SCOPUS:0042494540

VL - 75

SP - 143

EP - 162

JO - Journal of Multivariate Analysis

JF - Journal of Multivariate Analysis

SN - 0047-259X

IS - 1

ER -