Andronov–Pontryagin criterion
GPTKB entity
Statements (11)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:mathematical_concept
|
| gptkbp:appliesTo |
two-dimensional systems
|
| gptkbp:describes |
structural stability of dynamical systems
|
| gptkbp:field |
dynamical systems
|
| gptkbp:namedAfter |
gptkb:Lev_Pontryagin
gptkb:Aleksandr_Andronov |
| gptkbp:publishedIn |
1937
|
| gptkbp:state |
A two-dimensional system is structurally stable if and only if all its critical points and closed orbits are hyperbolic and there are no trajectories connecting saddle points.
|
| gptkbp:bfsParent |
gptkb:Aleksandr_Andronov
|
| gptkbp:bfsLayer |
7
|
| https://www.w3.org/2000/01/rdf-schema#label |
Andronov–Pontryagin criterion
|