A numerical algorithm for constructing polynomials stability for methods of the first order

Бесплатный доступ

An algorithm of stable polynomial coefficients obtaining up to degree m=27 for Runge-Kutta explicit methods of the first order of accuracy is constructed. The choice of polynomial ’s values at the points of extremum can influence on the size and shape of stability domain. The numerical results are submitted.

Explicit methods, stability polynomials, stiff problems

Короткий адрес: https://sciup.org/148182620

IDR: 148182620

Статья научная