| 1. | Solving diffusion equation with classic runge - kutta method
法求解扩散方程 |
| 2. | The convergence theorem of parallel runge - kutta methods for delay differential equation
多滞量线性微分方程系统的数值收敛性分析 |
| 3. | Two - step continuity runge - kutta methods of numerical simulation for singular delay differential equations
法关于一类延迟微分方程的渐近稳定性 |
| 4. | The paper also elaborates on the calculating method , the runge - kutta method and the grads method
论文对模型的算法? ?龙格?库塔法和梯度法作了详尽的讨论。 |
| 5. | The equation was solved with both the time finite element method and the fourth order runge - kutta method
分别用时间有限元方法和四阶的runge - kutta方法对方程进行了求解。 |
| 6. | The numerical values of the one order differential equations are obtained by runge - kutta method with variable step
软件采用了变步长的经典龙格?库塔方法求解一阶微分方程组的数值解。 |
| 7. | A 4 - order runge - kutta method is used to solve the droplet trajectory equation in order to determine the droplet impingement zone . 4
采用经典的四阶龙格-库塔法对其求解,以确定水滴在翼面上的撞击区。 |
| 8. | On solving the equation , we utilize the finite volume method . runge - kutta method with the dual time marching was also used here
在方程求解方面,采用了有限体积方法,采用runge - kutta方法对方程进行双时间推进。 |
| 9. | The n - s equations are discretized in space using a galerkin finite element approach , and are integrated in time using an explicit five - stage runge - kutta time - stepping scheme
N - s方程的空间离散采用galerkin有限元格式,时间推进应用显式五步r - k格式。 |
| 10. | Equidistant interpolation can give rise to convergence difficulties when the number of interpolation points becomes large . this difficulty is often referred to as runge ' s phenomenon
等距点插值会带来收敛困难当插值点数量增加。这一困难被称为龙格现象。 |
