The paper introduces a new numerical method for continuation of equilibria of models describing physiologically structured populations. To describe such populations, we use integral equations coupled with each other via interaction (or feedback) variables. Additionally we allow interaction with unstructured populations, described by ordinary differential equations. The interaction variables are chosen such that if they are given functions of time, each of the resulting decoupled equations becomes linear. Our numerical procedure to approximate an equilibrium which will use this special form of the underlying equations extensively. We also establish a method for local stability analysis of equilibria in dependence on parameters
Physiologically structured population models are typically formulated as a partial differential equa...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
In this thesis we study the existence and stability of positive equilibrium of a general model for t...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
We review the state-of-the-art concerning a mathematical framework for general physiologically struc...
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...
We are interested in the asymptotic stability of equilibria of structured populations modeled in ter...
In this thesis new numerical methods are presented for the analysis of models in population dynamics...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Physiologically structured population models are typically formulated as a partial differential equa...
Physiologically structured population models are typically formulated as a partial differential equa...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
In this thesis we study the existence and stability of positive equilibrium of a general model for t...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
The paper introduces a new numerical method for continuation of equilibria of models describing phy...
We review the state-of-the-art concerning a mathematical framework for general physiologically struc...
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...
We are interested in the asymptotic stability of equilibria of structured populations modeled in ter...
In this thesis new numerical methods are presented for the analysis of models in population dynamics...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
Physiologically structured population models are typically formulated as a partial differential equa...
Physiologically structured population models are typically formulated as a partial differential equa...
Considering the environmental condition as a given function of time, we formulate a physiologically ...
In this thesis we study the existence and stability of positive equilibrium of a general model for t...