EFFICIENT AND ACCURATE CHEBYSHEV DUAL-PETROV-G ALERKIN METHODS FOR ODD-ORDER DIFFERENTIAL EQUATIONS 被引量：1

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摘要 Efficient and accurate Chebyshev dual-Petrov-Galerkin methods for solving first-order equation,third-order equation,third-order KdV equation and fifth-order Kawahara equa-tion are proposed.Some Sobolev bi-orthogonal basis functions are constructed which lead to the diagonalization of discrete systems.Accordingly,both the exact solutions and the approximate solutions are expanded as an infinite and truncated Fourier-like series,respec-tively.Numerical experiments illustrate the effectiveness of the suggested approaches.

作者 Xuhong Yu Lusha Jin Zhongqing Wang

机构地区 School of Science

出处《Journal of Computational Mathematics》 SCIE CSCD 2021年第1期43-62,共20页 计算数学（英文）

基金 This work was supported by Natural Science Foundation of China(Nos.11571238,11601332 and 11871043).

关键词 Chebyshev dual-Petrov-Galerkin method Sobolev bi-orthogonal polynomials Odd-order differential equations Numerical results.

分类号 O17 [理学—基础数学]

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EFFICIENT AND ACCURATE CHEBYSHEV DUAL-PETROV-G ALERKIN METHODS FOR ODD-ORDER DIFFERENTIAL EQUATIONS 被引量：1

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