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CG
2005
Springer

Two-dimensional invariant manifolds in four-dimensional dynamical systems

13 years 11 months ago
Two-dimensional invariant manifolds in four-dimensional dynamical systems
This paper explores the visualization of two-dimensional stable and unstable manifolds of the origin (a saddle point) in a four-dimensional Hamiltonian system arising from control theory. The manifolds are computed using an algorithm that finds sets of points that lie at the same geodesic distance from the origin. By coloring the manifolds according to this geodesic distance, one can gain insight into the geometry of the manifolds and how they sit in four-dimensional space. This is compared with the more conventional method of coloring the fourth coordinate. We also take advantage of the symmetries present in the system, which allow us to visualize the manifolds from different viewpoints at the same time.
Hinke M. Osinga
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2005
Where CG
Authors Hinke M. Osinga
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