Resumen
In this work, we present the dynamics of biological control through a mathematical model using a
simple food chain of three trophic levels. This mathematical model is based on a ratio-dependent
predator-prey model with Holling type II functional response, adding a top predator so this model is
a system of three ordinary differential equations. We study the existence and uniqueness, invariance
and boundary of solutions. The information given in this work could also be useful for the design
of development plans that meet the needs of the agricultural sector to guide the non-pollution of the
environment in the country through the use of biological control to control pests.
simple food chain of three trophic levels. This mathematical model is based on a ratio-dependent
predator-prey model with Holling type II functional response, adding a top predator so this model is
a system of three ordinary differential equations. We study the existence and uniqueness, invariance
and boundary of solutions. The information given in this work could also be useful for the design
of development plans that meet the needs of the agricultural sector to guide the non-pollution of the
environment in the country through the use of biological control to control pests.
| Idioma original | Español (Perú) |
|---|---|
| Páginas (desde-hasta) | 112 |
| Número de páginas | 123 |
| Publicación | Selecciones Matemáticas |
| Volumen | 4 |
| N.º | 1 |
| DOI | |
| Estado | Publicada - 27 jun. 2017 |
Palabras Clave
- Predator - Prey,
- Food Chain
- Biological Control
- Scenarios Extinction
- Asymptotic Stability
- Runge - Kutta
Categoría OCDE
- Matemáticas aplicadas
ODS de las Naciones Unidas
Este resultado contribuye a los siguientes Objetivos de Desarrollo Sostenible
