Un modelo discreto bi-dimensional con denso-dependencia en la sobrevida
Abstract
In the present paper we show some results about a density-dependenttwo dimensional (juvenile- adult) population model in which survival coefficient is a linear function of population size. We identify necessary and sufficient conditions for the existence of bounded solulions and we study the existence and stability ofthe equilibrium points. We also study the bioeconomical problem of optimization ofsustainable yield.
References
Caswell, H. 1989. Matrix population models. Sinauer Associates, Inc. Publishers. Suderland, Massachussets. Pp. 230-256.
Clark, C. 1990. Mathematical Bioeconomics. J. Wiley. New York. Pp. 9-23.
Cushing, J.M. 1991. A simple model of cannibalism. Math. Biosc. 107:47-71.
Ebenman, B. 1988. Competition between age classes and population dynamics. 1. Theor. Biol. 131:389-400.
Guckenheimer, J., G. Oster Y A. Ipaktchi. 1977. The dynamics of density dependent population models. J. of Math. Biol. 4:101-147.
Levin, S.A. y P. Goodyear. 1980. Analysis of an age-structured fishery model. J. of Math. Biol. 9:245.
Silva, J. y T. Hallam. 1993. Effects of delay, truncations and density dependence in reproduction schedules on stability of nonlinear Leslie matrix models. J. of Math. Biol. 31:367-395.
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