Function of matrices and their application to boundary problems for a system of differential transport equations

In this paper we show that the method of upper and lower solutions coupled with the monotone iterative technique is valid to obtain constructive proofs of existence of solutions for nonlinear periodic boundary value problems of functional differential equations without assuming properties of monoton

We consider a boundary problem for an elliptic system of differential equations in a bounded region Ω ⊂ R n and where the spectral parameter is multiplied by a discontinuous weight function ω(x) = diag(ω1(x), . . . , ωN (x)). The problem is considered under limited smoothness assumptions and under a

This paper is concerned with a generalization of a functional differential equation known as the pantograph equation. The pantograph equation contains a linear functional argument. In this paper we generalize this functional argument to include nonlinear polynomials. In contrast to the entire soluti

A system of diflerential equations A(d/dt) x = Bx +f, along with the initial condition x(0) = k, is considered where A and B are m x n m&rices. Generalized inverses of the matrix A are used to derive algebraic conditions for the existence and uniqueness of a solution. An example is presented to illu