Relative equilibria of Hamiltonian systems with symmetry: Linearization, smoothness, and drift

Patrick, George W.

doi:10.1007/bf01212907

Cited by 35 publications

(76 citation statements)

References 17 publications

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“…In an important paper [60], George Patrick investigates the structure of the set of relative equilibria as quoted in the following theorem. He also studied the nearby dynamics and introduced the notion of drift around relative equilibria in terms of the linearized vector field there, but we will not be describing that aspect here.…”

Section: Geometric Bifurcationsmentioning

confidence: 99%

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Relative Equilibria and Conserved Quantities in Symmetric Hamiltonian Systems

Montaldi¹

2000

Peyresq Lectures on Nonlinear Phenomena

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Section: Geometric Bifurcationsmentioning

confidence: 99%

“…Theorem 5.1 (Patrick [60]) Assume G is compact, G p is finite and G ξ ∩ G µ is a maximal torus. Then in a neighbourhood of p the set of relative equilibria forms a smooth symplectic submanifold of P of dimension dim(G)+ rank(G).…”

Section: Geometric Bifurcationsmentioning

confidence: 99%

Relative Equilibria and Conserved Quantities in Symmetric Hamiltonian Systems

Montaldi¹

2000

Peyresq Lectures on Nonlinear Phenomena

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“…The appearance of the nilpotent part of the linearization is the foundational element of [6]. The value of κ e coincides with the derivative dξ αe e /dμ αe e from (1.5), as predicted by the general theory.…”

Section: Thus the Nongeneric Sector Has An Additional So(2)-symmetrymentioning

confidence: 79%

“…These equilibria are fixed points of the action of SO (2), and the analysis requires a transparent extension of the normal form in [6] to equilibria which have SO (2) …”

Section: Normal Form For the Equilibriamentioning

confidence: 99%

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Stability by KAM Confinement of Certain Wild, Nongeneric Relative Equilibria of Underwater Vehicles with Coincident Centers of Mass and Buoyancy

Patrick

2003

SIAM J. Appl. Dyn. Syst.

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Abstract. Purely rotational relative equilibria of an ellipsoidal underwater vehicle occur at nongeneric momentum where the symplectic reduced spaces change dimension. The stability of these relative equilibria under momentum changing perturbations is not accessible by Lyapunov functions obtained from energy and momentum. A blow-up construction transforms the stability problem to the analysis of symmetry-breaking perturbations of Hamiltonian relative equilibria. As such, the stability follows by KAM theory rather than energy-momentum confinement.

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Hamiltonian Systems near Relative Equilibria

Roberts

Wulff

Lamb

2002

Journal of Differential Equations

114

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We give explicit differential equations for the dynamics of Hamiltonian systems near relative equilibria. These split the dynamics into motion along the group orbit and motion inside a slice transversal to the group orbit. The form of the differential equations that is inherited from the symplectic structure and symmetry properties of the Hamiltonian system is analysed and the effects of time reversing symmetries are included. The results will be applicable to the stability and bifurcation theories of relative equilibria of Hamiltonian systems.

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Relative equilibria of Hamiltonian systems with symmetry: Linearization, smoothness, and drift

Cited by 35 publications

References 17 publications

Relative Equilibria and Conserved Quantities in Symmetric Hamiltonian Systems

Relative Equilibria and Conserved Quantities in Symmetric Hamiltonian Systems

Stability by KAM Confinement of Certain Wild, Nongeneric Relative Equilibria of Underwater Vehicles with Coincident Centers of Mass and Buoyancy

Hamiltonian Systems near Relative Equilibria

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