Computation of Nonlinear Galerkin Methods with Variable Modes for 2-D K-S Equations

机译：二维K-S方程的可变模式非线性Galerkin方法的计算

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Our objective, in this article, is to investigate the nonlinear Galerking method with variable modes for the two-dimensional Kuramoto-Sivashinsky (K-S) equations. Complicated computing formulas of this method and those of some other related methods are carefully derived. Numerical computation of examples shows the efficiency and advantage of our method over the usual nonlinear Galerkin method and the classical Galerkin method. The computational efficiency confirms the theoretical results.

机译：本文的目的是研究二维Kuramoto-Sivashinsky（K-S）方程的变模式非线性Galerking方法。仔细推导了此方法和其他一些相关方法的复杂计算公式。实例的数值计算表明，与常规的非线性Galerkin方法和经典Galerkin方法相比，我们的方法具有较高的效率和优势。计算效率证实了理论结果。

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《Guangzhou international symposium on advances in computational mathematics》|1999年|p.545-563|共19页
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Zhong Hua Yang; Yu Jiang Wu; Ben Yu Guo;
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中图分类 O2;
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Computation of Nonlinear Galerkin Methods with Variable Modes for 2-D K-S Equations

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