AbstractWe discuss numerical methods for the computation and continuation of equilibria and bifurcation points of equilibria of dynamical systems. We further consider the computation of cycles as a boundary value problem, their continuation and bifurcations. Homoclinic orbits can also be computed as (truncated) boundary value problems and numerically continued. On curves of homoclinic orbits further bifurcations can be detected and computed. We discuss the basic numerical methods, the connections between various computational objects, and provide references to the literature and software implementations
Abstract Mathematical modelling allows us to concisely describe fundamental principles in biology. ...
In this paper we present a general approach to rigorously validate Hopf bifurcations as well as sadd...
A semianalytical method is derived for finding the existence and stability of single-impact periodic...
AbstractWe discuss numerical methods for the computation and continuation of equilibria and bifurcat...
The paper provides full algorithmic details on switching to the continuation of all possible codim 1...
We consider numerical methods for the computation and continuation of the three generic secondary pe...
: This paper is a brief survey of numerical methods for computing bifurcations of generic families o...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
AbstractIn this paper, we show the combined use of analytical and numerical techniques in the study ...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
For the study of nonlinear dynamic systems, it is important to locate the equilibria and bifurcation...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
This book combines a comprehensive state-of-the-art analysis of bifurcations of discrete-time dynami...
Dynamical systems occur in many areas of science, especially fluid dynamics. One is often interested...
With the aim of applying numerical methods, we develop a formalism for physiologically structured po...
Abstract Mathematical modelling allows us to concisely describe fundamental principles in biology. ...
In this paper we present a general approach to rigorously validate Hopf bifurcations as well as sadd...
A semianalytical method is derived for finding the existence and stability of single-impact periodic...
AbstractWe discuss numerical methods for the computation and continuation of equilibria and bifurcat...
The paper provides full algorithmic details on switching to the continuation of all possible codim 1...
We consider numerical methods for the computation and continuation of the three generic secondary pe...
: This paper is a brief survey of numerical methods for computing bifurcations of generic families o...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
AbstractIn this paper, we show the combined use of analytical and numerical techniques in the study ...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
For the study of nonlinear dynamic systems, it is important to locate the equilibria and bifurcation...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
This book combines a comprehensive state-of-the-art analysis of bifurcations of discrete-time dynami...
Dynamical systems occur in many areas of science, especially fluid dynamics. One is often interested...
With the aim of applying numerical methods, we develop a formalism for physiologically structured po...
Abstract Mathematical modelling allows us to concisely describe fundamental principles in biology. ...
In this paper we present a general approach to rigorously validate Hopf bifurcations as well as sadd...
A semianalytical method is derived for finding the existence and stability of single-impact periodic...