In this paper, we present methods for a numerical equilibrium and stability analysis for models of a size structured population competing for an unstructured resource. We concentrate on cases where two model parameters are free, and thus existence boundaries for equilibria and stability boundaries can be defined in the (two-parameter) plane. We numerically trace these implicitly defined curves using alternatingly tangent prediction and Newton correction. Evaluation of the maps defining the curves involves integration over individual size and individual survival probability (and their derivatives) as functions of individual age. Such ingredients are often defined as solutions of ODE, i.e., in general only implicitly. In our case, the right-h...
We employ semigroup and spectral methods to analyze the linear stability of positive stationary solu...
The dynamics of a specific consumer-resource model for Daphnia magna is studied from a numerical poi...
This thesis explores the topic of mathematical modelling involving the simulation of population grow...
In this paper, we present methods for a numerical equilibrium and stability analysis for models of a...
With the aim of applying numerical methods, we develop a formalism for physiologically structured po...
We consider the interaction between a general size-structured consumer population and an unstructure...
In this paper, we analyze the convergence of a second order numerical method for the approximation o...
Producción CientíficaIn this paper, an efficient numerical method for the approximation of a nonline...
We consider the interaction between a general size-structured consumer population and an unstructure...
In this thesis new numerical methods are presented for the analysis of models in population dynamics...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
We are interested in the asymptotic stability of equilibria of structured populations modelled in te...
We are interested in the asymptotic stability of equilibria of structured populations modelled in te...
Physiologically structured population models are typically formulated as a partial differential equa...
To describe the dynamics of a size-structured population and its unstructured resource, we formulate...
We employ semigroup and spectral methods to analyze the linear stability of positive stationary solu...
The dynamics of a specific consumer-resource model for Daphnia magna is studied from a numerical poi...
This thesis explores the topic of mathematical modelling involving the simulation of population grow...
In this paper, we present methods for a numerical equilibrium and stability analysis for models of a...
With the aim of applying numerical methods, we develop a formalism for physiologically structured po...
We consider the interaction between a general size-structured consumer population and an unstructure...
In this paper, we analyze the convergence of a second order numerical method for the approximation o...
Producción CientíficaIn this paper, an efficient numerical method for the approximation of a nonline...
We consider the interaction between a general size-structured consumer population and an unstructure...
In this thesis new numerical methods are presented for the analysis of models in population dynamics...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
We are interested in the asymptotic stability of equilibria of structured populations modelled in te...
We are interested in the asymptotic stability of equilibria of structured populations modelled in te...
Physiologically structured population models are typically formulated as a partial differential equa...
To describe the dynamics of a size-structured population and its unstructured resource, we formulate...
We employ semigroup and spectral methods to analyze the linear stability of positive stationary solu...
The dynamics of a specific consumer-resource model for Daphnia magna is studied from a numerical poi...
This thesis explores the topic of mathematical modelling involving the simulation of population grow...