Research Article
Asymmetric Evolutionary Game Analysis of Building Information Modeling (BIM) Technology Diffusion
Table 2
det(J) and tr(J) corresponding to the equilibrium point.
| Equilibrium point | Determinants and trace expressions |
| (0, 0) | det(J) | (−K + C1−L) (−B + G−D−C2 + B′) | tr(J) | (−K + C1−L) + (−B + G−D−C2 + B′) | (0, 1) | det(J) | (γC1 + C1)[−(−B + G−D−C2 + B′)] | tr(J) | (γC1 + C1) + [−(−B + G−D−C2 + B′)] | (1, 0) | det(J) | [−(−K + C1−L)](γC1 + K–−B + G−C2 + B′) | tr(J) | [−(−K + C1−L)] + (γC1 + K–−B + G−C2 + B′) | (1, 1) | det(J) | [−(γC1 + C1)][−(γC1 + K–−B + G−C2 + B′)] | tr(J) | [−(γC1 + C1)] + [−(γC1 + K–−B + G−C2 + B′)] | (α∗, β∗) | det(J) | | tr(J) | 0 |
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