Green's function of the problem of bounded solutions in the case of a block triangular coefficient

Abstract

It is known that the equation x'(t)=Ax(t)+f(t), where A is a bounded linear operator, has a unique bounded solution x for any bounded continuous free term~f if and only if the spectrum of the coefficient A does not intersect the imaginary axis. The solution can be represented in the form equation* x(t)=∫-∞∞ G(s)f(t-s)\,ds. equation* The kernel G is called Green's function. In this paper, the case when A admits a representation by a block triangular operator matrix is considered. It is shown that the blocks of G are sums of special convolutions of Green's functions of diagonal blocks of A.