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Stable manifold theorem

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In mathematics, especially in the study of dynamical systems and differential equations, the stable manifold theorem is an important result about the structure of the set of orbits approaching a given hyperbolic fixed point.

Stable manifold theorem

Let

f:U\subset \mathbb {R} ^{n}\to \mathbb {R} ^{n}

be a smooth map with hyperbolic fixed point at p. We denote by $W^{s}(p)$ the stable set and by $W^{u}(p)$ the unstable set of p.

The theorem^[1]^[2] states that

$W^{s}(p)$ is a smooth manifold and its tangent space has the same dimension as the stable space of the linearization of f at p.
$W^{u}(p)$ is a smooth manifold and its tangent space has the same dimension as the unstable space of the linearization of f at p.

Accordingly $W^{s}(p)$ is a stable manifold and $W^{u}(p)$ is an unstable manifold.

See also

Notes

^ Pesin, Ya B (1977). "Characteristic Lyapunov Exponents and Smooth Ergodic Theory". Russ Math Surv. 32 (4): 55–114. doi:10.1070/RM1977v032n04ABEH001639. Retrieved 2007-03-10.
^ Ruelle, David (1979). "Ergodic theory of differentiable dynamical systems". Publications Mathématiques de l'IHÉS. 50: 27–58. Retrieved 2007-03-10.

S. S. Sritharan, "Invariant Manifold Theory for Hydrodynamic Transition", John Wiley & Sons, (1990), ISBN-10: 0582067812 ISBN-13: 978-0582067813

External links

StableManifoldTheorem at PlanetMath.

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