Research Article
An Evolutionary Game Analysis on Public Information Communication between the Government and the Public in China
Table 6
The evolutionary stability of local equilibrium points under four cases.
| | Case | Condition | Equilibrium point | | | Results |
| | Case 1 | | (0, 0) | + | + | Unstable point | | ③ | | (0, 1) | − | | Saddle point | | (1, 0) | + | − | ESS | | | (1, 1) | − | | Saddle point | | | | + | 0 | Central point | | Case 2 | | (0, 0) | + | + | Unstable point | | ④ | | (0, 1) | + | − | ESS | | (1, 0) | + | − | ESS | | | (1, 1) | + | + | Unstable point | | | | − | 0 | Central point | | Case 3 | | (0, 0) | − | | Saddle point | | ⑤ | | (0, 1) | − | | Saddle point | | (1, 0) | + | − | ESS | | | (1, 1) | − | | Saddle point | | | | − | 0 | Central point | | Case 4 | | (0, 0) | − | | Saddle point | | ⑥ | | (0, 1) | − | | Saddle point | | (1, 0) | + | − | ESS | | | (1, 1) | + | + | Unstable point | | | | + | 0 | Central point |
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From Table 6, we can obtain the cases in ③∼⑥. |
