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Abstract

We consider the identification problem that arises in the age-period-cohort models as well as in the extended chain-ladder model. We propose a canonical parameterization based on the accelerations of the trends in the three factors. This parameterization is exactly identified and eases interpretation, estimation and forecasting. The canonical parameterization is applied to a class of index sets which have trapezoidal shapes, including various Lexis diagrams and the insurance-reserving triangles.

References

Barnett
G.
Zehnwirth
B.
Best estimates for reserves
Proc. Casualty Actuar. Soc
2000
87
245
321

Google Scholar

OpenURL Placeholder Text

 

Carstensen
B.
Age-period-cohort models for the Lexis diagram
Statist. Med
2007
26
3018
45

Google Scholar

Crossref
Search ADS

 

Clayton
D.
Schifflers
E.
Models for temporal variation in cancer rates. II: Age-period-cohort models
Statist. Med
1987
6
469
81

Google Scholar

Crossref
Search ADS

 

Cox
D. R.
Hinkley
D. V.
Theoretical Statistics
1974
London
Chapman and Hall

 

England
P. D.
Verrall
R. J.
Stochastic claims reserving in general insurance
Br. Actuar. J
2002
8
519
44

Google Scholar

Crossref
Search ADS

 

Holford
T. R.
The estimation of age, period and cohort effects for vital rates
Biometrics
1983
39
311
24

Google Scholar

Crossref
Search ADS
PubMed

 

Keiding
N.
Statistical inference in the Lexis diagram
Phil. Trans. R. Soc. A
1990
332
487
509

Google Scholar

Crossref
Search ADS

 

R Development Core Team
R: A Language and Environment for Statistical Computing
2006
Vienna
R Foundation for Statistical Computing

Zehnwirth
B.
Probabilistic development factor models with applications to loss reserve variability, prediction intervals, and risk based capital
Casualty Actuar. Soc. Forum: 1994 Spring Forum
1994
447
605

Google Scholar

OpenURL Placeholder Text

 
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© 2008 Biometrika Trust
This is an Open Access article distributed under the terms of the Creative CommonsAttribution License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted reuse, distribution, and reproduction in any medium, provided the original work is properly cited.
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