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The two-sex multiethnic stable population model. (English) Zbl 0597.92019

This paper is a continuation of previous results of the author [Demography 18, 201-216 (1981) and J. Math. Biol. 18, 201-211 (1983; Zbl 0532.92019)] and examines demographic interactions between population groups. Specifically he discusses a two-sex multiethnic stable population model and it is shown that multiethnic stable populations are possible when an intergroup fertility is observed.
Reviewer: G.Karakostas

MSC:

92D25 Population dynamics (general)

Citations:

Zbl 0532.92019
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References:

[1] Granville, W. A.; Smith, P. R.; Longley, W. R., Elements of the Differential and Integral Calculus (1941), Ginn: Ginn Boston · JFM 67.0151.08
[2] Keyfitz, N., Introduction to the Mathematics of Population (1977), Addison-Wesley: Addison-Wesley Reading, Mass
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[4] Rogers, A., Introduction to Multiregional Mathematical Demography (1975), Wiley: Wiley New York
[5] Schoen, R., The harmonic mean as the basis of a realistic two-sex marriage model, Demography, 18, 201-216 (1981), (May)
[6] Schoen, R., Generalizing the life table model to incorporate interactions between the sexes, (Land, K. C.; Rogers, A., Multidimensional Mathematical Demography (1982), Academic Press: Academic Press New York), 385-443 · Zbl 0583.92014
[7] Schoen, R., Relationships in a simple harmonic mean two-sex fertility model, J. Math. Biol, 18, 201-211 (1983), (Dec.) · Zbl 0532.92019
[8] Schoen, R., A methodological analysis of intergroup marriage, (Sociological Methodology 1986 (1986), Jossey Bass: Jossey Bass San Francisco), in press
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