Mathematics – Dynamical Systems
Scientific paper
2012-02-02
SIAM Journal on Applied Dynamical Systems, Vol. 4, No. 3, pp. 854-879, 2009
Mathematics
Dynamical Systems
preprint version - for final version see journal reference
Scientific paper
10.1137/080741999
Slow manifolds are important geometric structures in the state spaces of dynamical systems with multiple time scales. This paper introduces an algorithm for computing trajectories on slow manifolds that are normally hyperbolic with both stable and unstable fast manifolds. We present two examples of bifurcation problems where these manifolds play a key role and a third example in which saddle-type slow manifolds are part of a traveling wave profile of a partial differential equation. Initial value solvers are incapable of computing trajectories on saddle-type slow manifolds, so the slow manifold of saddle type (SMST) algorithm presented here is formulated as a boundary value method. We take an empirical approach here to assessing the accuracy and effectiveness of the algorithm.
Guckenheimer John
Kuehn Christian
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