V. P. Maksimov
abstract:
A class of linear functional differential systems with continuous and discrete
times and discrete memory is considered. The paper gives an explicit description
of a family of uniquely solvable linear boundary value problems as a
neighborhood of a fixed uniquely solvable boundary value problem. The
description is based on an explicit representation of the principal components
to the general solution representation such as the fundamental matrix and the
Cauchy operator. In the study of the problems outside the class under
consideration, the systems with discrete memory can be employed as a model or
approximating ones. This can be useful as applied to systems with aftereffect
under studying rough properties that hold under small disturbances of the
parameters.
Mathematics Subject Classification: 34K10, 34K27, 34K34
Key words and phrases: Functional differential equations, continuous-discrete systems, linear boundary value problems, unique solvability conditions