This is an old revision of this page, as edited by Epimetreus (talk | contribs) at 20:59, 20 July 2006 (Wikified an instance of "Makeham"; Misplaced Pages seems to have nothing on William Matthew Makeham, whose name is joined with Gompertz's in this law.). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.
Revision as of 20:59, 20 July 2006 by Epimetreus (talk | contribs) (Wikified an instance of "Makeham"; Misplaced Pages seems to have nothing on William Matthew Makeham, whose name is joined with Gompertz's in this law.)(diff) ← Previous revision | Latest revision (diff) | Newer revision → (diff)The Gompertz-Makeham law states that death rate is a sum of age-independent component (Makeham term) and age-dependent component (Gompertz function), which increases exponentially with age. In a protected environment where external causes of death are rare (laboratory conditions, low mortality countries, etc.) the age-independent mortality component is often negligible, and in this case the formula simplifies to a Gompertz law of mortality (proposed by Benjamin Gompertz in 1825) with exponential increase in death rates with age.
The Gompertz-Makeham law of mortality describes the age dynamics of human mortality rather accurately in the age window of about 30-80 years. At more advanced ages the death rates do not increase as fast as predicted by this mortality law - a phenomenon known as the late-life mortality deceleration.
Historical decline in human mortality before 1950s was mostly due to decrease in the age-independent mortality component (Makeham parameter), while the age-dependent mortality component (the Gompertz function) was surprisingly stable in history before 1950s. After that a new mortality trend has started leading to unexpected decline in mortality rates at advanced ages and 'de-rectagularization' of the survival curve.
In terms of reliability theory the Gompertz-Makeham law of mortality represents a failure law, where the hazard rate is a mixture of non-aging failure distribution, and the aging failure distribution with exponential increase in failure rates.
The Gompertz law is the same as a Fisher-Tippett distribution for the negative of age, restricted to negative values for the random variable (positive values for age).
See also
- Ageing
- Biodemography of human longevity
- Biogerontology
- Demography
- Life table
- Maximum life span
- Mortality
- Reliability theory of aging and longevity
Further reading
- Leonid A. Gavrilov & Natalia S. Gavrilova (1991), The Biology of Life Span: A Quantitative Approach. New York: Harwood Academic Publisher, ISBN 3718649837
- Gavrilov, L.A., Nosov, V.N. A new trend in human mortality decline: derectangularization of the survival curve. Age, 1985, 8(3): 93-93.
- Gavrilov, L.A., Gavrilova, N.S., Nosov, V.N. Human life span stopped increasing: Why? Gerontology, 1983, 29(3): 176-180. PMID 6852544
- Gompertz, B., (1825). On the Nature of the Function Expressive of the Law of Human Mortality, and on a New Mode of Determining the Value of Life Contingencies. Philosophical Transactions of the Royal Society of London, Vol. 115 (1825)pp. 513-585.