On Some Properties of Linear Mapping Induced by Linear Descriptor Differential Equation

Abstract

In this paper we introduce linear mapping D from WnF⊂ Ln into Lm× Rm, induced by linear differential equation d/dt Fx(t)-C(t)x(t)=f(t),Fx(t0)=f0. We prove that D is closed dense defined mapping for any m× n-matrix F. Also adjoint mapping D* is constructed and its domain WmF is described. Some kind of so-called "integration by parts" formula for vectors from WnF, WmF is suggested. We obtain a necessary and sufficient condition for existence of generalized solution of equation Dx=(f,f0). Also we find a sufficient criterion for closureness of the R(D) in Lm× Rm which is formulated in terms of transparent conditions for blocks of matrix C(t). Some examples are supplied to illustrate obtained results.