nonlinear dynamical system
C50713
concept
A nonlinear dynamical system is a system whose evolution over time is governed by equations in which the change of state depends on the current state in a nonlinear way, often leading to complex behaviors such as bifurcations and chaos.
Observed surface forms (2)
| Surface form | Occurrences |
|---|---|
| nonlinear differential equation | 2 |
| feature of forced oscillatory systems | 1 |
Instances (4)
| Instance | Via concept surface |
|---|---|
| Abreu equation | nonlinear differential equation |
| Arnold tongue | feature of forced oscillatory systems |
| Lotka–Volterra equations | — |
| Riccati equation | nonlinear differential equation |