Uniformly stable solution of a nonlocal problem of coupled system of differential equations (Q2857749)

In this paper, the authors investigate the coupled system of differential equations NEWLINE\[NEWLINE \begin{aligned} & \frac{dx}{dt} = f_{1}(t, y(t)),\;t\in(0,T],\\ & \frac{dy}{dt} = f_{2}(t, x(t)),\;t\in(0,T], \end{aligned} NEWLINE\]NEWLINE with the nonlocal conditions NEWLINE\[NEWLINE \begin{aligned} & x(0) + \sum_{k=1}^{n} a_{k} x(\tau_{k}) = x_{0},\;a_{k} > 0,\;\tau_{k}\in(0,T), \\ & y(0) + \sum_{j=1}^{m} b_{j} y(\eta_{j}) = y_{0},\;b_{j} > 0,\;\eta_{j}\in(0,T). \end{aligned} NEWLINE\]NEWLINE The functions \(f_{i}:[0,T]\times\mathbb{R}\to\mathbb{R}\), \(i=1,2\), are continuous and satisfy a Lipschitz condition. The authors prove the local and global existence of solutions of this nonlocal problem. Moreover, the continuous dependence on \(x_{0}, y_{0}\) and the uniform stability are studied.