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将几种具有不同稳定性的Runge-Kutta方法应用到结构动力学方程的数值求解中。针对增量形式的动力学方程,使用改进的Newton-Raphson迭代,研究了减少计算量的两种方法:(1)使用单对角隐式Runge-Kutta方法,(2)应用转化矩阵。采用逼近算子的谱半径分析了稳定性与数值阻尼特性,解释了L-稳定方法抑制高频振荡的原因。数值算例表明在精确解上较小的物理阻尼能有效的抑制高频振荡,但对各种直接积分方法的影响很小,高精度的L-稳定Runge-Kutta方法能在有效抑制高频振荡的同时高精度的求解低频振动。Abstract: Several Runge-Kutta methods with the different stability were applied to solve the equations of motion in structural dynamics. For incremental dynamical equations,using the modified Newton-Raphson iteration,two methods to reduce the amount of work were proposed. The first one is the singly diagonally implicit Runge-Kutta methods,and the second one is to apply the transform matrix. Using the spectral radii of approximation operators,the stability analysis and the numerical damping property were studied,and the reason why the L-stability methods could wipe out the high oscillations was explained. Numerical example was solved by several direct integration methods,the result show that the small physical damping can wipe out high oscillations effectively on exact solution,but it has little effect on numerical solution,and the high order L-stability Runge-Kutta methods can wipe out the high oscillation effectively,at the same time,solve the vibration of low frequencies with high accuracy. 相似文献
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多步块格式是一类新的一般线性方法,在求解微分-代数方程的过程中不会出现精度降低现象。研究了多步块格式的构造方法,精度条件及具有Runge-Kutta稳定性的多步块格式,多步块格式具有刚性精确的优点,且级精度与格式精度相等。构造了具有Runge-Kutta稳定性的2级和3级多步块格式,具有L-稳定性。数值算例证实多步块格式在求解微分-代数方程不会精度降低。Abstract: The multistep block methods are a new class of general linear methods,and the methods solve the differential-algebraic equations with no order reduction.The construction of the multistep block methods was described,and order condition and stability was studied.The multistep block methods with Runge-Kutta stability were also constructed.The multistep block methods have many nice properties,for example,stiffly accurate,and stage order is equal to order of method.At last the methods of 2-stage and 3-stage with Runge-Kutta stability were constructed,and they have the property of L-stability.The numerical example shows that the multistep block methods can solve the differential-algebraic equations without the order reduction. 相似文献
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