On the existence of solutions for the boundary value problem of quasilinear differential equations on an infinite interval (Q1103087)

Let A be real \(n\times n\) matrix continuous on \(R^+\times R^ n\), where \(R^+=[0,+\infty)\), F be an \(R^ n\)-valued function continuous on \(R^+\times R^ n\), \({\mathcal N}\) be a continuous operator from \(C_ r^{\lim}\) into \(R^ n\), and \(C_ r^{\lim}=\{x\in C(R^+);\lim_{t\to +\infty}x(t)\) exists and \(\| x(t)\| \leq r\}\). The authors consider the problem of the existence of solutions for the quasilinear differential system with a boundary condition: \(x'=A(t,x)x+F(t,x),\) \({\mathcal N}(x)=0\).