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Spectral submanifold

From Wikipedia, the free encyclopedia
Schematic illustration of a spectral submanifold emanating from a spectral subspace . A trajectory in the reduced coordinates is mapped to the phase space via the manifold parametrization .[1]

In dynamical systems, a spectral submanifold (SSM) is the unique smoothest invariant manifold serving as the nonlinear extension of a spectral subspace of a linear dynamical system under the addition of nonlinearities.[2] SSM theory provides conditions for when invariant properties of eigenspaces of a linear dynamical system can be extended to a nonlinear system, and therefore motivates the use of SSMs in nonlinear dimensionality reduction.

Definition

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Consider a nonlinear ordinary differential equation of the form

with constant matrix and the nonlinearities contained in the smooth function .

Assume that for all eigenvalues of , that is, the origin is an asymptotically stable fixed point. Now select a span of eigenvectors of . Then, the eigenspace is an invariant subspace of the linearized system

Under addition of the nonlinearity to the linear system, generally perturbs into infinitely many invariant manifolds. Among these invariant manifolds, the unique smoothest one is referred to as the spectral submanifold.

An equivalent result for unstable SSMs holds for .

Existence

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The spectral submanifold tangent to at the origin is guaranteed to exist provided that certain non-resonance conditions are satisfied by the eigenvalues in the spectrum of .[3] In particular, there can be no linear combination of equal to one of the eigenvalues of outside of the spectral subspace. If there is such an outer resonance, one can include the resonant mode into and extend the analysis to a higher-dimensional SSM pertaining to the extended spectral subspace.

Non-autonomous extension

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The theory on spectral submanifolds extends to nonlinear non-autonomous systems of the form

with a quasiperiodic forcing term.[4]

Significance

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Spectral submanifolds are useful for rigorous nonlinear dimensionality reduction in dynamical systems. The reduction of a high-dimensional phase space to a lower-dimensional manifold can lead to major simplifications by allowing for an accurate description of the system's main asymptotic behaviour.[5] For a known dynamical system, SSMs can be computed analytically by solving the invariance equations, and reduced models on SSMs may be employed for prediction of the response to forcing.[6]

Furthermore these manifolds may also be extracted directly from trajectory data of a dynamical system with the use of machine learning algorithms.[7]

See also

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References

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  1. ^ Jain, Shobhit; Haller, George (2022). "How to compute invariant manifolds and their reduced dynamics in high-dimensional finite element models". Nonlinear Dynamics. 107 (2): 1417–1450. doi:10.1007/s11071-021-06957-4. hdl:20.500.11850/519249. S2CID 232269982.
  2. ^ Haller, George; Ponsioen, Sten (2016). "Nonlinear normal modes and spectral submanifolds: Existence, uniqueness and use in model reduction". Nonlinear Dynamics. 86 (3): 1493–1534. arXiv:1602.00560. doi:10.1007/s11071-016-2974-z. S2CID 44074026.
  3. ^ Cabré, P.; Fontich, E.; de la Llave, R. (2003). "The parametrization method for invariant manifolds I: manifolds associated to non-resonant spectral subspaces". Indiana Univ. Math. J. 52: 283–328. doi:10.1512/iumj.2003.52.2245. hdl:2117/876.
  4. ^ Haro, A.; de la Llave, R. (2006). "A parameterisation method for the computation of invariant tori and their whiskers in quasiperiodic maps: Rigorous results". Differ. Equ. 228 (2): 530–579. Bibcode:2006JDE...228..530H. doi:10.1016/j.jde.2005.10.005.
  5. ^ Rega, Giuseppe; Troger, Hans (2005). "Dimension Reduction of Dynamical Systems: Methods, Models, Applications". Nonlinear Dynamics. 41 (1–3): 1–15. doi:10.1007/s11071-005-2790-3. S2CID 14728580.
  6. ^ Ponsioen, Sten; Pedergnana, Tiemo; Haller, George (2018). "Automated computation of autonomous spectral submanifolds for nonlinear modal analysis". Journal of Sound and Vibration. 420: 269–295. arXiv:1709.00886. Bibcode:2018JSV...420..269P. doi:10.1016/j.jsv.2018.01.048. S2CID 44186335.
  7. ^ Cenedese, Mattia; Axås, Joar; Bäuerlein, Bastian; Avila, Kerstin; Haller, George (2022). "Data-driven modeling and prediction of non-linearizable dynamics via spectral submanifolds". Nature Communications. 13 (1): 872. arXiv:2201.04976. Bibcode:2022NatCo..13..872C. doi:10.1038/s41467-022-28518-y. PMC 8847615. PMID 35169152.
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