DYNAMICS AND BIFURCATIONS IN A TRITROPHIC FOOD-CHAIN MODEL WITH GROUP DEFENCE MECHANISM AND INTERN-PREDATOR COMPETITION
This research has two main topics, i.e. a new method for computing fold and cusp bifurcation in a system of two ordinary differential equations, and a mathematical model for tritrophic food chains with group defense mechanism and intern-predator competition. In the first topic, we prove that the...
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| Main Author: | |
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| Format: | Dissertations |
| Language: | Indonesia |
| Subjects: | |
| Online Access: | https://digilib.itb.ac.id/gdl/view/52955 |
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| Institution: | Institut Teknologi Bandung |
| Language: | Indonesia |
| Summary: | This research has two main topics, i.e. a new method for computing fold and cusp
bifurcation in a system of two ordinary differential equations, and a mathematical
model for tritrophic food chains with group defense mechanism and intern-predator
competition.
In the first topic, we prove that the fold bifurcation point in that system corresponds
to a local maximum or minimum of a constrained optimization problem,
which can be computed using the classical Lagrange multiplier method. Conversely,
we provide a sufficient condition so that the solution of a particular constrained
optimization problem using the Lagrange multiplier method, corresponds to a fold
bifurcation of two ordinary differential equations. Similarly, for a system with two
parameters, we also provide sufficient conditions for cusp bifurcation point. Then
we apply the method into the subsystem of our tritrophic food-chain model.
In tritrophic food chains model, we first concern on condition when the ratio of
maximum per capita growth rate of predator and top predator goes to zero. This
condition implies the top predator becomes constant. By choosing the top predator
constant as a bifurcation parameter and applying Lagrange multiplier method, we
identify all of fold bifurcation points in this subsystem. By using AUTO software,
we get another codimension-one bifurcation points. Then we find more complex
dynamical behaviors as an impact of intern-predator competition, i.e. cusp, Bautin,
and Bogdanov-Takens bifurcations. Furthermore, we indicate a codimension-three
bifurcation, i.e. Swallow-tail bifurcation and cusp Bogdanov-Takens bifurcation.
The latter can be considered a new bifurcation because no research has been studied.
Finally, we identify and analyze all the codimension-one and codimension-two
bifurcations of the tritrophic food chains model. We also provide some interesting
attractors and indicate a chaotic dynamics by varying a parameter of group
mechanism defense. |
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