Dynamical systems with intricate behaviour are all-pervasive in biology. Many of the most interesting biological processes indicate the presence of bifurcations, i.e. phenomena where a small change in a system parameter causes qualitatively different behaviour. Bifurcation theory has become a rich field of research in its own right and evaluating the bifurcation behaviour of a given dynamical system can be challenging. An even greater challenge, however, is to learn the bifurcation structure of dynamical systems from data, where the precise model structure is not known. Here, we study one aspects of this problem: the practical implications that the presence of bifurcations has on our ability to infer model parameters and initial conditions ...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
The bifurcation and nonlinear stability properties of the Meinhardt-Gierer model for biochemical pa...
It is shown that nonlinear global models identified from a single time series can be used to reprodu...
AbstractThe increasingly widespread use of parametric mathematical models to describe biological sys...
One of the interesting properties of nonlinear dynamical systems is that arbitrarily small changes i...
In this chapter we summarize the basic definitions and tools of analysis of dynamical systems, with ...
An issue in mathematical modeling is that multiple models describe the same data based on different ...
The dynamics of single populations up to ecosystems, are often described by one or a set of non-line...
Complex systems such as ecosystems, electronic circuits, lasers or chemical reactions can be modelle...
This paper emphasizes the usefulness of bifurcation theory for studying the behavior of complex syst...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
Parameter variations in the equations of motion of dynamical systems are identified by time series a...
Many biological populations breed seasonally and have nonoverlapping generations, so that their dyna...
<br/> <br/>Dynamical systems modelling physical processes often evolve on several time- ...
Bifurcation phenomena are common in multi-dimensional multi-parameter dynamical systems. Normal form...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
The bifurcation and nonlinear stability properties of the Meinhardt-Gierer model for biochemical pa...
It is shown that nonlinear global models identified from a single time series can be used to reprodu...
AbstractThe increasingly widespread use of parametric mathematical models to describe biological sys...
One of the interesting properties of nonlinear dynamical systems is that arbitrarily small changes i...
In this chapter we summarize the basic definitions and tools of analysis of dynamical systems, with ...
An issue in mathematical modeling is that multiple models describe the same data based on different ...
The dynamics of single populations up to ecosystems, are often described by one or a set of non-line...
Complex systems such as ecosystems, electronic circuits, lasers or chemical reactions can be modelle...
This paper emphasizes the usefulness of bifurcation theory for studying the behavior of complex syst...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
Parameter variations in the equations of motion of dynamical systems are identified by time series a...
Many biological populations breed seasonally and have nonoverlapping generations, so that their dyna...
<br/> <br/>Dynamical systems modelling physical processes often evolve on several time- ...
Bifurcation phenomena are common in multi-dimensional multi-parameter dynamical systems. Normal form...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
The bifurcation and nonlinear stability properties of the Meinhardt-Gierer model for biochemical pa...
It is shown that nonlinear global models identified from a single time series can be used to reprodu...