Following [2], a model aiming at the description of two competing populations is introduced. In particular, it is considered a nonlinear system consisting of a nonlocal conservation law for predators coupled with a parabolic equation for prey. The drift term in the equation for predators is in general a nonlocal and nonlinear function of the prey density: the movement of predators can hence be directed towards regions where the concentration of prey is higher. Lotka-Volterra type right hand sides describe the feeding. In [2] the resulting Cauchy problemis proved to be well posed in any space dimension with respect to the L1 topology, and estimates on the growth of the solution in L1 and L∞norm and on the time dependence are provided. Numerical integrations show a few qualitative features of the solutions. This is a joint work with RinaldoM. Colombo.

Rossi, E. (2016). A mixed hyperbolic-parabolic system to describe predator-prey dynamics. Intervento presentato a: International Conference on Hyperbolic Problems IMPA : Theory, Numerics and Applications 28 july - 1 august, Rio de Janeiro, Brasil [10.1007/s00574-016-0179-1].

A mixed hyperbolic-parabolic system to describe predator-prey dynamics

ROSSI, ELENA
2016

Abstract

Following [2], a model aiming at the description of two competing populations is introduced. In particular, it is considered a nonlinear system consisting of a nonlocal conservation law for predators coupled with a parabolic equation for prey. The drift term in the equation for predators is in general a nonlocal and nonlinear function of the prey density: the movement of predators can hence be directed towards regions where the concentration of prey is higher. Lotka-Volterra type right hand sides describe the feeding. In [2] the resulting Cauchy problemis proved to be well posed in any space dimension with respect to the L1 topology, and estimates on the growth of the solution in L1 and L∞norm and on the time dependence are provided. Numerical integrations show a few qualitative features of the solutions. This is a joint work with RinaldoM. Colombo.
paper
Nonlocal Conservation Laws, Predatory–Prey Systems, Mixed Hyperbolic–Parabolic Problems
English
International Conference on Hyperbolic Problems IMPA : Theory, Numerics and Applications 28 july - 1 august
2014
giu-2016
2016
47
2
701
714
none
Rossi, E. (2016). A mixed hyperbolic-parabolic system to describe predator-prey dynamics. Intervento presentato a: International Conference on Hyperbolic Problems IMPA : Theory, Numerics and Applications 28 july - 1 august, Rio de Janeiro, Brasil [10.1007/s00574-016-0179-1].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/89734
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