On the Uniquely Solvability of Cauchy Problem and Dependences of Parameters for a Certain Class of Linear Functional Differential Equations

The objectives of this paper is to investigate the Cauchy problem of the type ( ℒx)(t) x(t) – p(ṫ )x(t) = f(t). x(a) = α, tϵ[a, b] and to establishes the necessary and sufficient conditions for it solvability if the matrix are sum able. Thus the above equations can be re written as . Where X is a fundamental matrix such that X(a) is the identity matrix, also can be represented as the general solution of the equation of the type ℒx=f. So the studying equations can be written as a boundary value problem of linear functional differential equations of the form ℒx=f, IX= α. The Green Operators was used to established the conditions that guarantee uniquely solvable bounded value problem of the type defined above. The paper also considered the case where the boundary value problems continuous dependence of parameters, to established conditions that guarantee uniquely solvability of the equations of the form ℒox = f, ℒox = α and ℒkx = f,ℒkx = α With the establishment of these two arguments, the objectives of this paper was established.