Reducibility of differential equations in the space of bounded numerical sequences (Q914020)

Infinite dimensional systems of the form \((1)\quad dy/dt=A(t)y\) where y belongs to the space of bounded numerical sequences \(x=(x_ n)\) with the norm \(\| x\| =\sup | x_ n|\) and A is an infinite matrix on \(T=[t_ 0,t_ 1]\subset R\). The problem of reducibility of (1) to the form \((2)\quad dx/dt=Bx\) with a constant infinite matrix B is considered. Conditions for reducibility of (1) to (2) are derived as well as limit properties of the reducing matrix and of B are given in terms of a certain sequence of finite dimensional problems of a similar form.