Hostname: page-component-5c6d5d7d68-wtssw Total loading time: 0 Render date: 2024-08-07T02:05:28.476Z Has data issue: false hasContentIssue false
  • English
  • Français

Models in Motor Insurance

Published online by Cambridge University Press:  11 August 2014

M. C. Bennett
Get access

Extract

The introduction of high-speed electronic computers has opened the way for analyses of motor insurance risk statistics on a scale not previously possible. We may regard the purpose of the analyses which form the subject of this note as being to test the validity of the existing rating structure by finding out how the claims experience varies from one rating cell to another within that structure; and, more generally, to explore the possibility of devising a more efficient rating structure by defining new levels within the existing factors, or by using new factors in addition to, or in replacement of, those already used.

To achieve this purpose it is appropriate to consider on the one hand a detailed investigation of the experience over a limited period, analogous to that carried out when constructing a new standard life table and, on the other hand, a system for keeping the emerging experience under more or less continuous review. For this second aspect it is natural to think in terms of making comparisons between the actual experience and that expected according to the standard table.

Type
Research Article
Information
Journal of the Staple Inn Actuarial Society , Volume 22 , June 1978 , pp. 134 - 160
Copyright
Copyright © Institute of Actuaries Students' Society 1978

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

BIBLIOGRAPHY

[1] Almer, B. (1957) ‘Risk Analysis in Theory and Practical Statistics’. Transactions of the 15th International Congress of Actuaries, II, 314.Google Scholar
[2] Bailey, R. A. and Simon, L. (1960) ‘Two Studies in Automobile Insurance Ratemaking’. ASTIN Bulletin, I, 192.CrossRefGoogle Scholar
[3] Boehm, C. (19711972) ‘Das Faktoren-und das Summanden-Modell’. Blätter der Deutschen Gesellschaft für Versicherungsmathematik, Band X, Heft 1.Google Scholar
[4] Cramér, H. (1945) Mathematical Methods of Statistics. Published by Princeton University Press.Google Scholar
[5] Ferrara, G. (1971) ‘Review of Mathematical Models for the Construction and Control of Tariffs’. Translation (in Institute Library) of a lecture given to the Italian Institute of Actuaries, and published in Giornale dell' Istituto Italiano degli Attuari, p. 1.Google Scholar
[6] Grimes, T. (1971) ‘Claim Frequency Analysis in Motor Insurance’. J.S.S. 19, 147.Google Scholar
[7] Johnson, P. D. (1969) ‘The Analysis of Motor Insurance Statistics’. OECD Symposium, Crowthorne.Google Scholar
[8] Johnson, P. D. and Hey, G. B. (1971) ‘Statistical Studies in Motor Insurance’. J.I.A. 97, 199.Google Scholar
[9] Jung, J. (1968) ‘On automobile insurance ratemaking—estimating relativities in a multiplicative model’. ASTIN Bulletin, V, 41.CrossRefGoogle Scholar
[10] Mehring, J. (1964) ‘Ein mathematisches Hilfsmittel für Statistik- und Tariffragen in der Kraftfahrtversicherung’. Blätter der Deutschen Gesellschaft für Versicherungsmathematik, Band VII, Heft 1.Google Scholar
[11] Osborn, J. (1975) ‘A multiplicative model for the analysis of vital statistics rates’. J.R.S.S. 24, 75.Google Scholar