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IJBC
2008

Computation and Visualization of bifurcation Surfaces

14 years 18 days ago
Computation and Visualization of bifurcation Surfaces
The localization of critical parameter sets called bifurcations is often a central task of the analysis of a nonlinear dynamical system. Bifurcations of codimension 1 that can be directly observed in nature and experiments form surfaces in three dimensional parameter spaces. In this paper we propose an algorithm that combines adaptive triangulation with the theory of complex systems to compute and visualize such bifurcation surfaces in a very efficient way. The visualization can enhance the qualitative understanding of a system. Moreover, it can help to quickly locate more complex bifurcation situations corresponding to bifurcations of higher codimension at the intersections of bifurcation surfaces. Together with the approach of generalized models the proposed algorithm enables us to gain extensive insights in the local and global dynamics not only in one special system but in whole classes of systems. To illustrate this ability we analyze three examples from different fields of scien...
Dirk Stiefs, Thilo Gross, Ralf Steuer, Ulrike Feud
Added 12 Dec 2010
Updated 12 Dec 2010
Type Journal
Year 2008
Where IJBC
Authors Dirk Stiefs, Thilo Gross, Ralf Steuer, Ulrike Feudel
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