Numerical solution of linear differential equations with discontinuous coefficients and Henstock integral

Abstract

In this article we consider the problem of approximative solution of linear differential equations y'+p(x)y=q(x) with discontinuous coefficients p and q. We assume that coefficients of such equation are Henstock integrable functions. To find the approximative solution we change the original Cauchy problem to another problem with piecewise-constant coefficients. The sharp solution of this new problems is the approximative solution of the original Cauchy problem. We find the degree approximation in terms of modulus of continuity ωδ (P),\ ωδ (Q), where P and Q are f-primitive for coefficients p and q.