Research Article
Chaos-Based Application of a Novel Multistable 5D Memristive Hyperchaotic System with Coexisting Multiple Attractors
Table 2
Dynamical behavior under different parameter of a when b = 12, c = 30, d = 2, e = 4, m = 0.1, and n = 0.01.
| a | Dynamics | Figure |
| 1.0 | Limit cycle with period-1 | Figure 4(a) | 2.0 | Two-wing chaotic attractor | Figure 4(b) | 3.2 | Stable state period-2 | Figure 4(c) | 8.0 | Two-wing chaotic attractor | Figure 4(d) | 10.1 | Four-wing chaotic attractor | Figure 4(e) | 11.7 | Stable state period-3 | Figure 4(f) | 14.6 | Hyperchaotic attractor | Figure 4(g) | 17.0 | Quasi-periodic | Figure 4(h) | 18.2 | Limit cycle with period-1 | Figure 4(i) |
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