ON SOME COMPARISION OF THE NUMERICAL METHODS APPLIED TO SOLVE ODES, VOLTERRA INTEGRAL AND INTEGRO DIFFERENTIAL EQUATIONS
Keywords:
Multistep method with third derivative, stable and degree, the conseption degree and stability, advanced multistep third derivaties methods, explicit and implicit methodsAbstract
The many problems of the different fields of nature are reduce to solve initialvalue
problem for the both Ordinary Differential Equation and Volterra integro-differential equation
and also to solve Volterra integral equation. And for solving theser problems in usually are
used the numerical methods, which are related with the development of computer sciences. In
among of them, the multistep multiderivative methods are very developing. Therefor, any result
in this area is of interest in always. The ordinary multistep method and multistep second derivative
methods fundamentally investigated by Dahlquist. The Dahlquist theory development by
Ibrahimov, who have receive similarly results for the advanced multistep methods and advanced
multistep second derivative methods. Here by development of these results, have considered to
investigation of the multistep third derivative methods with constant coefficients. Somebody can
be take the results receiving for the estimation of the accuracy for stable and unstable multistep
multiderivative methods with third derivative as the simple generalization of the known results.
Here have shown that this is not correct. Noted that multistep multiderivative Methods with third
derivative here investigated in fool form, found some connection between degree and order for
these methods in the cases: stable and in stable. Constructed some concrete methods of multistep
third derivative types and recommended some way for the application of these methods to solve
some problems.
