On the convergence of solutions to a system of linear differential equations in Banach spaces (Q1293714)

The author deals with the dependence of the solutions of linear differential equations under persistent disturbances. More precisely, let be considered in a Banach space \(B\) the following three initial value problems: \[ x'=A(t)x, x(0)=x_{0}, x'=(A(t)+R(t,\varepsilon))x,x(0)=x_{0} \quad \text{and} \quad y'=R(t,\varepsilon)y, y(0)=y_{0}. \] Assume that their respective solutions \(x(t), x(t,\varepsilon), y(t,\varepsilon)\) exist on the interval \([0,T]\) of the real line. The main result of the paper is the following: The condition \(x(.,\varepsilon)\to{x(.)}\) in \(L^{p}\) as \(\varepsilon\to{0}\), for each \(x_{0}\in{B}\) is necessary and sufficient for \(y(.,\varepsilon)\to{y^{0}}\) in \(L^{p}\) as \(\varepsilon\to{0}\) for each \(y_{0}\in{B}\) and \(1\leq{p}\leq{+\infty}\).