Finite analytic numerical method for two-point boundary value problems of ordinary differential equations

Piecewise-linearized methods for the solution of two-point boundary value problems in ordinary differential equations are presented. These problems are approximated by piecewise linear ones which have analytical solutions and reduced to finding the slope of the solution at the left boundary so that

In this paper, we prove a limit theorem applicable to the asymptotic solution of stochastic two-point boundary-value and eigenvalue problems of a wide class of non-linear ordinary differential equations. Let E, 0 < E << 1, be a small parameter, and y ( s ) for 0 5 s <m a stochastic process. Then ~(

Systems of simultaneous second-order nonlinear ordinary differential equations with boundary conditions at two points are solved by a new numerical scheme. By adding fictitious accumulation terms, ordinary differential equations become parabolic partial differential equations. A stable numerical met