Advances in Civil Engineering

Research Article

Asymmetric Evolutionary Game Analysis of Building Information Modeling (BIM) Technology Diffusion

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