Pollard Decomposition
Pollard's decomposition breaks a difference in life expectancy between two populations into additive contributions from each age, showing exactly how much of the gap is due to mortality differences at infancy, in midlife, or in old age. John Pollard derived a continuous-age formula expressing the life-expectancy difference as an integral of the age-specific mortality-rate difference weighted by life-table functions. Because the contributions sum exactly to the total gap and can be further split by cause of death, the method is a standard tool for explaining why one population outlives another.
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Sources
- Pollard, J. H. (1982). The expectation of life and its relationship to mortality. Journal of the Institute of Actuaries, 109(2), 225–240. DOI: 10.1017/S0020268100036258 ↗
- Preston, S. H., Heuveline, P., & Guillot, M. (2001). Demography: Measuring and Modeling Population Processes. Blackwell. ISBN: 9781557864512
How to cite this page
ScholarGate. (2026, June 22). Pollard's Decomposition of the Life-Expectancy Difference. ScholarGate. https://scholargate.app/en/demography/pollard-decomposition
Which method?
Set this method beside its closest kin and read them side by side — the library lays the books on the table; the choice is yours.
- Arriaga DecompositionDemography↔ compare
- Kitagawa DecompositionDemography↔ compare
- Life TableDemography↔ compare
- Lifespan InequalityDemography↔ compare