摘要
结合已有研究常微分系统解的Robust稳定性和Robust耗散性的方法 ,对系统dxdt =f(t,x) (f(t,0 ) =0 ) 的扰动系统dxdt=f(t,x) +g(t,x) (f,g∈C[I×SH,Rn] ,SH {x|‖x‖ ≤H} ) ,研究了该系统具有Robust收敛性 .
In this paper, the system dxdt=f(t,x)(f(t,0)=0) within the disturbing dxdt=f(t,x)+g(t,x)(f,g∈C [I×S H,[WTHZ]R n],S H{x|‖x‖≤H})is studied. Its Robust convergence is proved in terms of a method associated with Robust stability and Robust dissipation for ordinary differential equations.,S H{x|‖x‖≤H})is studied. Its Robust convergence is proved in terms of a method associated with Robust stability and Robust dissipation for ordinary differential equations.
出处
《四川师范大学学报(自然科学版)》
CAS
CSCD
2002年第1期22-25,共4页
Journal of Sichuan Normal University(Natural Science)
基金
四川省重点科研基金资助项目