Research Article
Hopf Bifurcation and Chaos of a Delayed Finance System
Table 1
The dynamic behaviors of system (
4) for different
| | Dynamics of system (4) | Figure |
| [0, 1.52) | and are both stable | Figure 14(a) | (1.52, 3.18] | System (4) is chaotic | Figure 14(b) | (3.18, 5.52] | System (4) exhibits period 1 motion | Figure 14(c) | (5.52, 5.61] | System (4) is chaotic | Figure 14(d) | (5.61, 8.32] | and are both stable | Figure 14(e) | (8.32, 9.46] | System (4) exhibits period 1 motion | Figure 14(f) | (9.46, 9.68] | System (4) exhibits period 2 motion | Figure 14(g) | (9.68, 9.71] | System (4) exhibits period 4 motion | Figure 14(h) | (9.71, 12] | System (4) is chaotic | Figure 14(i) |
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