An approach to numerical solution of multipoint boundary-value problems

Multipoint boundary value problems (MPBVP's) for ordinary differential equations arise naturally in technical applications. For a given dynamic system with n degrees of freedom, there may be available exactly n states observed at n different times. A mathematical description of such a system results

The problem of analysis qf linear time-varying systems with multipoint boundary conditions is studied. The solution is derived in terms of block-pulse functions. The proposed method has the distinct advantage over other techniques in that it reduces the problem to that qf solving linear algebraic eq

new finite-difference scheme for both singularly perturbed and unperturbed quadratic boundary value problems is proposed, and its stability and convergence analyzed. Numerical results are given for some application problems.