On the momentum of pseudostable populations
BACKGROUND: Keyfitz introduced in 1971 the “population momentum” – that is, the amount of further population growth (decline) if an instantaneous reduction (increase) of fertility to the replacement level occurred in a stable population. OBJECTIVE: We wanted to find analytical results for the moment...
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Max Planck Institute for Demographic Research
2025-03-01
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| Series: | Demographic Research |
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| Online Access: | https://www.demographic-research.org/articles/volume/52/15 |
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| author | Gustav Feichtinger Roland Rau Andreas J. Novák |
| author_facet | Gustav Feichtinger Roland Rau Andreas J. Novák |
| author_sort | Gustav Feichtinger |
| collection | DOAJ |
| description | BACKGROUND: Keyfitz introduced in 1971 the “population momentum” – that is, the amount of further population growth (decline) if an instantaneous reduction (increase) of fertility to the replacement level occurred in a stable population. OBJECTIVE: We wanted to find analytical results for the momentum of pseudostable populations – that is, populations that relax the strict assumptions of the stable population model and allow fertility reductions at a constant rate. METHODS: The formal methods to analyze pseudostable populations are similar to those used in classical stable population theory. Numerical simulations, based on data from the United Nations’ World Population Prospects, show that the simplifying assumptions of our formal methods – rectangular survival and childbearing at a single age – do not affect the qualitative nature of our findings. RESULTS: The pseudostable population momentum is a monotonously declining S-shaped function approaching zero with increasing time. Maximum momentum converges to a theoretical upper limit defined by the ratio of life expectancy at birth and the mean age at childbearing. We prove that the timing, when the momentum is one, occurs when the net reproductive rate is already smaller than one – unlike in stable populations. CONCLUSIONS: Pseudostable populations describe the transition from a very young to a very old population. By deriving the population momentum for pseudostable populations, we are extending the analytical understanding of population dynamics for models that are less restrictive than the canonical stable population model. CONTRIBUTION: Some countries in Latin America experience a fertility transition that closely resembles the assumptions of pseudostable populations. Our analytical results could contribute to the understanding of population dynamics in these countries. |
| format | Article |
| id | doaj-art-d36a7b57e17d4a36887140a18907cd3f |
| institution | DOAJ |
| issn | 1435-9871 |
| language | English |
| publishDate | 2025-03-01 |
| publisher | Max Planck Institute for Demographic Research |
| record_format | Article |
| series | Demographic Research |
| spelling | doaj-art-d36a7b57e17d4a36887140a18907cd3f2025-08-20T02:52:30ZengMax Planck Institute for Demographic ResearchDemographic Research1435-98712025-03-01521544547810.4054/DemRes.2025.52.156330On the momentum of pseudostable populationsGustav Feichtinger0Roland Rau1Andreas J. Novák2Österreichische Akademie der WissenschaftenUniversität RostockUniversität WienBACKGROUND: Keyfitz introduced in 1971 the “population momentum” – that is, the amount of further population growth (decline) if an instantaneous reduction (increase) of fertility to the replacement level occurred in a stable population. OBJECTIVE: We wanted to find analytical results for the momentum of pseudostable populations – that is, populations that relax the strict assumptions of the stable population model and allow fertility reductions at a constant rate. METHODS: The formal methods to analyze pseudostable populations are similar to those used in classical stable population theory. Numerical simulations, based on data from the United Nations’ World Population Prospects, show that the simplifying assumptions of our formal methods – rectangular survival and childbearing at a single age – do not affect the qualitative nature of our findings. RESULTS: The pseudostable population momentum is a monotonously declining S-shaped function approaching zero with increasing time. Maximum momentum converges to a theoretical upper limit defined by the ratio of life expectancy at birth and the mean age at childbearing. We prove that the timing, when the momentum is one, occurs when the net reproductive rate is already smaller than one – unlike in stable populations. CONCLUSIONS: Pseudostable populations describe the transition from a very young to a very old population. By deriving the population momentum for pseudostable populations, we are extending the analytical understanding of population dynamics for models that are less restrictive than the canonical stable population model. CONTRIBUTION: Some countries in Latin America experience a fertility transition that closely resembles the assumptions of pseudostable populations. Our analytical results could contribute to the understanding of population dynamics in these countries. https://www.demographic-research.org/articles/volume/52/15formal demographynumerical illustrationpseudostable populationsstable population theory |
| spellingShingle | Gustav Feichtinger Roland Rau Andreas J. Novák On the momentum of pseudostable populations Demographic Research formal demography numerical illustration pseudostable populations stable population theory |
| title | On the momentum of pseudostable populations |
| title_full | On the momentum of pseudostable populations |
| title_fullStr | On the momentum of pseudostable populations |
| title_full_unstemmed | On the momentum of pseudostable populations |
| title_short | On the momentum of pseudostable populations |
| title_sort | on the momentum of pseudostable populations |
| topic | formal demography numerical illustration pseudostable populations stable population theory |
| url | https://www.demographic-research.org/articles/volume/52/15 |
| work_keys_str_mv | AT gustavfeichtinger onthemomentumofpseudostablepopulations AT rolandrau onthemomentumofpseudostablepopulations AT andreasjnovak onthemomentumofpseudostablepopulations |