An integration algorithm of variable configuration based on explicit-implicit schemes of 4th order of accuracy

Бесплатный доступ

An L-stable (4,2)-method of 4th order of accuracy and an explicit Runge-Kutta scheme of 4th order of accuracy are constructed. An integration algorithm of variable step size is formulated. The most effective numerical scheme is chosen for each step by means of stability control. The numerical results which confirm the effectiveness of the algorithm are given.

Explicit and implicit methods, stability and accuracy control, stiff problems

Короткий адрес: https://sciup.org/148181252

IDR: 148181252

Статья научная