We study the A-stability and accuracy characteristics of Clenshaw-Curtis collocation. We present closed-form expressions to evaluate the Runge-Kutta coefficients of these methods. From the A-stability study, Clenshaw-Curtis methods are A-stable up to a high number of nodes. High accuracy is another benefit of these methods; numerical experiments demonstrate that they can match the accuracy of the Gauss-Legendre collocation, which has the optimal accuracy order of all Runge-Kutta methods.
翻译:我们研究了Clenshaw-Curtis合用同一地点的A稳定性和准确性特征,我们用封闭式表达方式来评价这些方法的龙格-库塔系数。从“稳定”研究中,Clenshaw-库塔方法的稳定性和准确性可达很多节点。高准确性是这些方法的另一个好处;数字实验表明,它们能够与高斯-伦德雷合用同一地点的准确性相匹配,而高斯-伦德雷方法具有所有龙格-库塔方法的最佳准确性。
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