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Literature DB >> 3585195

Equilibrium and local stability in a logistic matrix model for age-structured populations.

Abstract

A logistic matrix model for age-structured population dynamics is constructed. This model discretizes a continuous, density-dependent model with age structure, i.e. it is an extension of the logistic model to the case of age-dependence. We prove the existence and uniqueness of its equilibrium and give a necessary and sufficient condition for the local stability of the equilibrium.

Mesh：

Year: 1987 PMID： 3585195 DOI： 10.1007/bf00275889

Source DB: PubMed Journal: J Math Biol ISSN： 0303-6812 Impact factor: 2.259

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1. Biological populations obeying difference equations: stable points, stable cycles, and chaos.

Authors: R M May
Journal: J Theor Biol Date: 1975-06 Impact factor: 2.691

2. On the use of matrices in certain population mathematics.

Authors: P H LESLIE
Journal: Biometrika Date: 1945-11 Impact factor: 2.445

3. A General Method for Investigating the Equilibrium of Gene Frequency in a Population.

Authors: R C Lewontin
Journal: Genetics Date: 1958-05 Impact factor: 4.562

4. Equilibrium and stability in populations whose interactions are age-specific.

Authors: M Rotenberg
Journal: J Theor Biol Date: 1975-10 Impact factor: 2.691

5. Stability of an age specific population with density dependent fertility.

Authors: C Rorres
Journal: Theor Popul Biol Date: 1976-08 Impact factor: 1.570

6. The dynamics of density dependent population models.

Authors: J Guckenheimer; G Oster; A Ipaktchi
Journal: J Math Biol Date: 1977-05-23 Impact factor: 2.259

7. Life not lived due to disequilibrium in heterogeneous age-structured populations.

Authors: R A Desharnais; J E Cohen
Journal: Theor Popul Biol Date: 1986-06 Impact factor: 1.570

8. Local stability of a population with density-dependent fertility.

Authors: C Rorres
Journal: Theor Popul Biol Date: 1979-12 Impact factor: 1.570

9. Non-linear age-dependent population growth.

Authors: E Sinestrari
Journal: J Math Biol Date: 1980-06 Impact factor: 2.259

10. Stability of population growth determined by 2 X 2 Leslie matrix with density-dependent elements.

Authors: D Cooke; J A Leon
Journal: Biometrics Date: 1976-06 Impact factor: 2.571

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