Approximation properties of solutions to multipoint boundary-value problems

Abstract

We consider a wide class of linear boundary-value problems for systems of m ordinary differential equations of order r, known as general boundary-value problems. Their solutions y:[a,b] Cm belong to the Sobolev space (W1r)m, and the boundary conditions are given in the form By=q where B:(C(r-1))mrm is an arbitrary continuous linear operator. We prove that a solution to such a problem can be approximated with an arbitrary precision in (W1r)m by solutions to multipoint boundary-value problems with the same right-hand sides. These multipoint problems are built explicitly and do not depend on the right-hand sides of the general boundary-value problem. For these problems, we obtain estimates of errors of solutions in the normed spaces (W1r)m and (C(r-1))m.