Paper detail

The existence and unicity of numerical solution of initial value problems by Walsh polynomials approach

Chen and Hsiao gave the numerical solution of initial value problems of systems of linear differential equations with constant coefficients by Walsh polynomials approach. This result was improved by Gát and Toledo for initial value problems of differential equations with variable coefficients on the interval $[0,1[$ and initial value $ξ=0$. In the present paper we discuss the general case while $ξ$ can take any arbitrary value in the interval $[0,1[$. We show the existence and uniform convergence of the numerical solution, as well.