Add to ORKGA methodology to track bifurcations of periodic orbits in large-scale dissipative systems depending on two parameters is presented. It is based on the application of iterative Newton-Krylov techniques to extended systems. To evaluate the action of the Jacobian it is necessary to integrate variational equations up to second order. It is shown that this is possible by integrating systems of dimension at most four times that of the original equations. In order to check the robustness of the method, the thermal convection of a mixture of two fluids in a rectangular domain has been used as a test problem. Several curves of codimension-one bifurcations, and the boundaries of an Arnold's tongue of rotation number 1/8, have been computed.Peer Revie...
A two-dimensional thermal convection problem in a circular annulus subject to a constant inward radi...
There is a growing interest in the study of periodic phenomena in largescale nonlinear dynamical sys...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
A methodology to track bifurcations of periodic orbits in large-scale dissipative systems depending ...
A new efficient methodology for the continuation of the codimension-one bifurcations of periodic orb...
A new efficient methodology for the continuation of the codimension-one bifurcations of periodic or...
The application of the multiple shooting method to the continuation of periodic orbits in large-scal...
The application of the multiple shooting method to the continuation of periodic orbits in large-scal...
We present a numerical algorithm for the continuation of periodic orbits of high-dimensional dissipa...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Recently several attempts have been made to identify and analyse periodic orbits in realistic fluid ...
methods. A thermal convection fluid dynamics problem, which has a rich bifurcation diagram due to sy...
A two-dimensional thermal convection problem in a circular annulus subject to a constant inward radi...
There is a growing interest in the study of periodic phenomena in largescale nonlinear dynamical sys...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
A methodology to track bifurcations of periodic orbits in large-scale dissipative systems depending ...
A new efficient methodology for the continuation of the codimension-one bifurcations of periodic orb...
A new efficient methodology for the continuation of the codimension-one bifurcations of periodic or...
The application of the multiple shooting method to the continuation of periodic orbits in large-scal...
The application of the multiple shooting method to the continuation of periodic orbits in large-scal...
We present a numerical algorithm for the continuation of periodic orbits of high-dimensional dissipa...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Recently several attempts have been made to identify and analyse periodic orbits in realistic fluid ...
methods. A thermal convection fluid dynamics problem, which has a rich bifurcation diagram due to sy...
A two-dimensional thermal convection problem in a circular annulus subject to a constant inward radi...
There is a growing interest in the study of periodic phenomena in largescale nonlinear dynamical sys...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...