Chaotic attractors¶
Systems · Continuous
47 systems in this category.
| system | dim | summary |
|---|---|---|
| Arneodo | 3 | |
| Chua | 3 | |
| Dadras | 3 | |
| Duffing | 3 | |
| GuckenheimerHolmes | 3 | |
| Halvorsen | 3 | |
| HenonHeiles | 4 | |
| HyperLorenz | 4 | |
| HyperRossler | 4 | |
| HyperYan | 4 | |
| HyperYangChen | 4 | |
| KuramotoSivashinsky | n | 1D Kuramoto–Sivashinsky PDE on a periodic domain, discretized with N grid points. |
| Lorenz | 3 | Lorenz (1963) strange attractor. |
| Lorenz84 | 3 | |
| Lorenz96 | n | Lorenz-96 model on a 1D ring of N weakly coupled scalar variables. |
| LorenzBounded | 3 | |
| LorenzCoupled | 6 | |
| MultiChua | n | Ring of n_circuits Chua circuits coupled through their x-variables. |
| NoseHoover | 3 | |
| PehlivanWei | 3 | |
| RabinovichFabrikant | 3 | |
| RikitakeDynamo | 3 | |
| Rossler | 3 | |
| Rucklidge | 3 | |
| SprottA | 3 | |
| SprottB | 3 | |
| SprottC | 3 | |
| SprottD | 3 | |
| SprottE | 3 | |
| SprottF | 3 | |
| SprottG | 3 | |
| SprottH | 3 | |
| SprottI | 3 | |
| SprottJ | 3 | |
| SprottJerk | 3 | |
| SprottK | 3 | |
| SprottL | 3 | |
| SprottM | 3 | |
| SprottMore | 3 | |
| SprottN | 3 | |
| SprottO | 3 | |
| SprottP | 3 | |
| SprottQ | 3 | |
| SprottR | 3 | |
| SprottS | 3 | |
| SprottTorus | 3 | |
| Thomas | 3 |