Existence and unity in a two-species system with age structure
1 Department of Aplied Mathematics and Information Technologies, Yuriy Fedkovych Chernivtsi National University, Chernivtsi, 58000, Ukraine
Keywords:
a two-species system with age structure
Abstract
The theorem on the existence and uniqueness of system solution with age-structure for two interacting species have been proved.
References
[1] Von Foerster H. Some remarks on changing populations // Kinetics of Cellular Proliferation. - New- York: Grune and Stratton, 1959. - P. 382 - 407.
[2] Matsenko V.G. Nonlinear model of the dynamics of the age structure of populations // Nonlinear oscillations. - 2003. - 6, № 3. - P. 357 - 367.
[3] Volterra V. Mathematical theory of the struggle for existence. - M.: Nauka, 1976. - 286 p.
[4] Bazykin A.D. Nonlinear dynamics of interacting populations. - M.: IKI, 2003. - 368 p.
[5] Venturino E. Age-structured predator-prey models // Mathematical Modelling. - 1984. - 5. - P. 117 - 128.
Cite
- ACS Style
- Matsenko, V.G. Existence and unity in a two-species system with age structure. Bukovinian Mathematical Journal. 2018, 1
- AMA Style
- Matsenko VG. Existence and unity in a two-species system with age structure. Bukovinian Mathematical Journal. 2018; 1(336).
- Chicago/Turabian Style
- Vasyl Grigorovich Matsenko. 2018. "Existence and unity in a two-species system with age structure". Bukovinian Mathematical Journal. 1 no. 336.
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