2002
DOI: 10.1016/s0167-2789(02)00430-x
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Bushes of vibrational modes for Fermi–Pasta–Ulam chains

Abstract: Some exact solutions and multi-mode invariant submanifolds were found for the Fermi-Pasta-Ulam (FPU) β-model by Poggi and Ruffo in Phys. D 103 (1997) 251. In the present paper we demonstrate how results of such a type can be obtained for an arbitrary Nparticle chain with periodic boundary conditions with the aid of our group-theoretical approach [Phys. D 117 (1998) 43] based on the concept of bushes of normal modes in mechanical systems with discrete symmetry. The integro-differential equation describing the… Show more

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Cited by 83 publications
(140 citation statements)
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“…A more systematic method for finding invariant manifolds in a physical system should be based on the symmetries of this system. The only reference that exploits these symmetries for the FPU lattice is [5] in which so-called 'bushes of normal modes' are computed. These 'bushes' are simply invariant manifolds of a certain type.…”
Section: In Whichmentioning
confidence: 99%
“…A more systematic method for finding invariant manifolds in a physical system should be based on the symmetries of this system. The only reference that exploits these symmetries for the FPU lattice is [5] in which so-called 'bushes of normal modes' are computed. These 'bushes' are simply invariant manifolds of a certain type.…”
Section: In Whichmentioning
confidence: 99%
“…These results were obtained using a direct linear stability analysis around the periodic orbit corresponding to the π-mode. Similar methods have been more recently applied to other modes and other FPU potentials by Chechin [71,72] and Rink [73]. A technique which allows for a more general exploration of the dynamics starting from short wavelengths is to follow an envelope function of the oscillators defined by ψ i = (−1) i q i .…”
Section: Dynamics At Short Wavelengths: Chaotic Breathersmentioning
confidence: 99%
“…Such a set is an invariant manifold in Fourier space. The question of existence has been positively solved [70,71]. For instance, modes k = N 4 ; N 3 ; N 2 ; 2N 3 ; 3N 4 (2.73)…”
Section: Short-wavelength (High-frequency) Initial Conditionsmentioning
confidence: 99%
See 1 more Smart Citation
“…Other authors, cf. [5], have baptized these invariant manifolds bushes of normal modes. The restriction of a Hamiltonian vector field to a fixed point set of a group is often easy to compute:…”
Section: Discrete Symmetrymentioning
confidence: 99%