On asteroid retrieval missions enabled by invariant manifold dynamics

In this article, we construct a C1 stable invariant manifold for the delay differential equation x′=Ax(t)+Lxt+f(t,xt) assuming the ρ-nonuniform exponential dichotomy for the corresponding solution operator. We also assume that the C1 perturbation, f(t,xt), and its derivative are sufficiently small and satisfy smoothness conditions. To obtain the invariant manifold, we follow the method developed by Lyapunov and Perron. We also show the dependence of invariant manifold on the perturbation f(t,xt).

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Invariant manifold-guided impulsive stabilization of delay equations

IEEE Transactions on Automatic Control ◽

10.1109/tac.2021.3057988 ◽

2021 ◽

pp. 1-1

Author(s):

Kevin Church ◽

Xinzhi Liu

Keyword(s):

Invariant Manifold ◽

Delay Equations ◽

Impulsive Stabilization

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Stability and invariant manifold for a predator-prey model with Allee effect

Advances in Difference Equations ◽

10.1186/1687-1847-2013-348 ◽

2013 ◽

Vol 2013 (1) ◽

Cited By ~ 2

Author(s):

Ünal Ufuktepe ◽

Sinan Kapçak ◽

Olcay Akman

Keyword(s):

Invariant Manifold ◽

Allee Effect ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model

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GENERALIZED SYNCHRONIZATION, FREQUENCY-LOCKING AND PHASE-LOCKING OF COUPLED SINE CIRCLE MAPS

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127401003280 ◽

2001 ◽

Vol 11 (08) ◽

pp. 2245-2253

Author(s):

WEN-XIN QIN

Keyword(s):

Dynamical Systems ◽

Invariant Manifold ◽

Coupling Strength ◽

Phase Locking ◽

Coupled System ◽

Generalized Synchronization ◽

Frequency Locking ◽

Local Systems ◽

Circle Maps ◽

The Individual

Applying invariant manifold theorem, we study the existence of generalized synchronization of a coupled system, with local systems being different sine circle maps. We specify a range of parameters for which the coupled system achieves generalized synchronization. We also investigate the relation between generalized synchronization, predictability and equivalence of dynamical systems. If the parameters are restricted in the specified range, then all the subsystems are topologically equivalent, and each subsystem is predictable from any other subsystem. Moreover, these subsystems are frequency locked even if the frequencies are greatly different in the absence of coupling. If the local systems are identical without coupling, then the widths of the phase-locked intervals of the coupled system are the same as those of the individual map and are independent of the coupling strength.

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