In mathematics, structural stability is an aspect of stability theory concerning whether a given function is sensitive to a small perturbation. The general idea is that a function or flow is structurally stable if any other function or flow close enough to it has similar dynamics (from the topological viewpoint, analogous to Lyapunov stability), which essentially means that the dynamics will not change under small perturbations.

Definition

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Given a metric space $(X,d)$ and a homeomorphism $f\backslash colon\; X\backslash to\; X$, we say that $f$ is structurally stable if there is a neighborhood $\{V\}$ of $f$ in $\backslash operatorname\{Homeo\}(X)$ (the space of all homeomorphisms mapping $X$ to itself endowed with the compact-open topology) such that every element of $\{V\}$ is topologically conjugate to $f$.

If $M$ is a compact smooth manifold, a $\backslash mathcal\{C\}^k$ diffeomorphism $f$ is said to be $\backslash mathcal\{C\}^k$ structurally stable if there is a neighborhood of $f$ in $\backslash operatorname\{Diff\}^k(M)$ (the space of all $\backslash mathcal\{C\}^k$ diffeomorphisms from $M$ to itself endowed with the strong $\backslash mathcal\{C\}^k$ topology) in which every element is topologically conjugate to $f$.

If $X$ is a vector field in the smooth manifold $M$, we say that $X$ is $\backslash mathcal\{C\}^k$-structurally stable if there is a neighborhood of $X$ in $\{X\}^k(M)$ (the space of all $\backslash mathcal\{C\}^k$ vector fields on $M$ endowed with the strong $\backslash mathcal\{C\}^k$ topology) in which every element is topologically equivalent to $X$, i.e. such that every other field $Y$ in that neighborhood generates a flow on $M$ that is topologically equivalent to the flow generated by $X$.

See also

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• sensitive dependence on initial conditions
• stability
• homeostasis
• self-stabilization, superstabilization

Differential equations | Dynamical systems | Stability theory | 構造安定