We discuss new and improved algorithms for the bifurcation analysis of fixed points and periodic orbits (cycles) of maps and their implementation in matcont, a MATLAB toolbox for continuation and bifurcation analysis of dynamical systems. This includes the numerical continuation of fixed points of iterates of the map with one control parameter, detecting and locating their bifurcation points (i.e., limit point, period-doubling, and Neimark–Sacker) and their continuation in two control parameters, as well as detection and location of all codimension 2 bifurcation points on the corresponding curves. For all bifurcations of codim 1 and 2, the critical normal form coefficients are computed, both numerically with finite directional differences a...
MatcontM is a matlab toolbox for numerical analysis of bifurcations of periodic orbits of maps. It c...
Explicit computational formulas for the coefficients of the periodic normal forms for all codim 1 bi...
Abstract: This paper investigates the dynamics and stability properties of a so-called planar trunca...
We discuss new and improved algorithms for the bifurcation analysis of fixed points and periodic orb...
Abstract. We discuss new and improved algorithms for the bifurcation analysis of fixed points and pe...
This book combines a comprehensive state-of-the-art analysis of bifurcations of discrete-time dynami...
This thesis investigates some properties of discrete-time dynamical systems, generated by iterated m...
Bifurcation software is an essential tool in the study of dynamical systems. From the beginning (the...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
This letter describes a new computational method to obtain the bifurcation parameter value of a limi...
cl matcont and matcont are matlab continuation packages for the interactive numerical study of a ran...
MatcontM is a matlab toolbox for numerical analysis of bifurcations of fixed points and periodic orb...
A recent application field of bifurcation theory is in modelling the cell cycle. We refer in particu...
MatContM is a MATLAB interactive toolbox for the numerical study of iterated smooth maps, their Lyap...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
MatcontM is a matlab toolbox for numerical analysis of bifurcations of periodic orbits of maps. It c...
Explicit computational formulas for the coefficients of the periodic normal forms for all codim 1 bi...
Abstract: This paper investigates the dynamics and stability properties of a so-called planar trunca...
We discuss new and improved algorithms for the bifurcation analysis of fixed points and periodic orb...
Abstract. We discuss new and improved algorithms for the bifurcation analysis of fixed points and pe...
This book combines a comprehensive state-of-the-art analysis of bifurcations of discrete-time dynami...
This thesis investigates some properties of discrete-time dynamical systems, generated by iterated m...
Bifurcation software is an essential tool in the study of dynamical systems. From the beginning (the...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
This letter describes a new computational method to obtain the bifurcation parameter value of a limi...
cl matcont and matcont are matlab continuation packages for the interactive numerical study of a ran...
MatcontM is a matlab toolbox for numerical analysis of bifurcations of fixed points and periodic orb...
A recent application field of bifurcation theory is in modelling the cell cycle. We refer in particu...
MatContM is a MATLAB interactive toolbox for the numerical study of iterated smooth maps, their Lyap...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
MatcontM is a matlab toolbox for numerical analysis of bifurcations of periodic orbits of maps. It c...
Explicit computational formulas for the coefficients of the periodic normal forms for all codim 1 bi...
Abstract: This paper investigates the dynamics and stability properties of a so-called planar trunca...