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(Top) 1 Formal definition 2 See also 3 References 4 Further reading

Equilibrium point (mathematics)

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Stability diagram classifying Poincaré maps of linear autonomous system

x'=Ax,

as stable or unstable according to their features. Stability generally increases to the left of the diagram.^[1] Some sink, source or node are equilibrium points.

Inmathematics, specifically in differential equations, an equilibrium point is a constant solution to a differential equation.

Formal definition[edit]

The point ${\tilde {\mathbf {x} }}\in \mathbb {R} ^{n}$ is an equilibrium point for the differential equation

{\frac {d\mathbf {x} }{dt}}=\mathbf {f} (t,\mathbf {x} )

if $\mathbf {f} (t,{\tilde {\mathbf {x} }})=\mathbf {0}$ for all $t$ .

Similarly, the point ${\tilde {\mathbf {x} }}\in \mathbb {R} ^{n}$ is an equilibrium point (orfixed point) for the difference equation

{\textstyle \mathbf {x} _{k+1}=\mathbf {f} (k,\mathbf {x} _{k})}

if $\mathbf {f} (k,{\tilde {\mathbf {x} }})={\tilde {\mathbf {x} }}$ for $k=0,1,2,\ldots$ .

Equilibria can be classified by looking at the signs of the eigenvalues of the linearization of the equations about the equilibria. That is to say, by evaluating the Jacobian matrix at each of the equilibrium points of the system, and then finding the resulting eigenvalues, the equilibria can be categorized. Then the behavior of the system in the neighborhood of each equilibrium point can be qualitatively determined, (or even quantitatively determined, in some instances), by finding the eigenvector(s) associated with each eigenvalue.

An equilibrium point is hyperbolic if none of the eigenvalues have zero real part. If all eigenvalues have negative real parts, the point is stable. If at least one has a positive real part, the point is unstable. If at least one eigenvalue has negative real part and at least one has positive real part, the equilibrium is a saddle point and it is unstable. If all the eigenvalues are real and have the same sign the point is called a node.

References[edit]

^ Egwald Mathematics - Linear Algebra: Systems of Linear Differential Equations: Linear Stability Analysis Accessed 10 October 2019.

Further reading[edit]

Boyce, William E.; DiPrima, Richard C. (2012). Elementary Differential Equations and Boundary Value Problems (10th ed.). Wiley. ISBN 978-0-470-45831-0.
Perko, Lawrence (2001). Differential Equations and Dynamical Systems (3rd ed.). Springer. pp. 102–104. ISBN 1-4613-0003-7.

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