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equilibrium point (Definition)

Consider an autonomous differential equation

$\displaystyle \dot{x}=f(x).$ (1)


An equilibrium point $ x_0$ of (1) is such that $ f(x_0)=0$. Conversely a regular point of (1) is such that $ f(x_0)\neq 0$.

If the linearization $ Df(x_0)$ has no eigenvalue with zero real part, $ x_0$ is said to be a hyperbolic equilibrium, whereas if there exists an eigenvalue with zero real part, the equilibrium point is nonhyperbolic.

An equilibrium point $ x_0$ is said to be stable if for every neighborhood $ x_0$,$ U$ there exists a neighborhood of $ x_0$, $ U'\subset U$ such that every solution of (1) with initial condition in $ U'$ (i.e. $ x(0)\in U'$), satisfies

$\displaystyle x(t)\in U$
for all $ t\geq0$.

Consequently an equilibrium point $ x_0$ is said to be unstable if it is not stable.

Moreover an equilibrium point $ x_0$ is said to be asymptotically stable if it is stable and there exists $ U''$ such that every solution of (1) with initial condition in $ U''$ (i.e. $ x(0)\in U''$) satisfies

$\displaystyle \lim_{t\to\infty}x(t)=x_0.$



"equilibrium point" is owned by Daume. [ full author list (2) | owner history (1) ]
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Other names:  steady state solution, fixed point, singular point
Also defines:  hyperbolic equilibrium, nonhyperbolic equilibrium, stable, unstable, asymptotically stable
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Cross-references: initial condition, solution, neighborhood, real part, eigenvalue, linearization, regular point, differential equation, autonomous
There are 35 references to this entry.

This is version 7 of equilibrium point, born on 2002-12-23, modified 2005-05-06.
Object id is 3815, canonical name is HyperbolicEquilibriumPoint.
Accessed 17233 times total.

Classification:
AMS MSC34C99 (Ordinary differential equations :: Qualitative theory :: Miscellaneous)
Pending Errata and Addenda
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