摘要:A Lotka–Volterra commensal symbiosis model with density dependent birth rate that takes the form d x d t = x ( b 11 b 12 + b 13 x − b 14 − a 11 x + a 12 y ) , d y d t = y ( b 21 b 22 + b 23 y − b 24 − a 22 y ) , $$ egin{aligned} & rac{dx}{dt}=x iggl( rac{b_{11}}{b_{12}+b_{13}x}-b_{14}-a_{11}x+a_{12}y iggr), \ & rac{dy}{dt}=y iggl( rac{b_{21}}{b_{22}+b_{23}y}-b_{24}-a_{22}y iggr), nd{aligned} $$ where b i j $b_{ij}$ , i = 1 , 2 $i=1, 2$ , j = 1 , 2 , 3 , 4 $j=1, 2, 3, 4$ , a 11 $a_{11}$ , a 12 $a_{12} $ , and a 22 $a_{22}$ are all positive constants, is proposed and studied in this paper. The system may admit four nonnegative equilibria. By constructing some suitable Lyapunov functions, we show that under some suitable assumptions, all of the four equilibria may be globally asymptotically stable, such a property is quite different to the traditional Lotka–Volterra commensalism model. With introduction of the density dependent birth rate, the dynamic behaviors of the commensalism model become complicated.
关键词:Commensalism model ; Density dependent birth rate ; Global stability
