A new method to obtain approximate symmetry of nonlinear evolution equation from perturbations 被引量：2

A new method to obtain approximate symmetry of nonlinear evolution equation from perturbations

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摘要 A novel method for obtaining the approximate symmetry of a partial differential equation with a small parameter is introduced. By expanding the independent variable and the dependent variable in the small parameter series, we obtain more affluent approximate symmetries. The method is applied to two perturbed nonlinear partial differential equations and new approximate solutions are derived. A novel method for obtaining the approximate symmetry of a partial differential equation with a small parameter is introduced. By expanding the independent variable and the dependent variable in the small parameter series, we obtain more affluent approximate symmetries. The method is applied to two perturbed nonlinear partial differential equations and new approximate solutions are derived.

作者张智勇雍雪林陈玉福

机构地区 School of Mathematical Sciences Department of Mathematics and Physics

出处《Chinese Physics B》 SCIE EI CAS CSCD 2009年第7期2629-2633,共5页 中国物理B（英文版）

关键词 approximate symmetry approximate solutions EXPANSION perturbed equation approximate symmetry approximate solutions expansion perturbed equation

分类号 O411.1 [理学—理论物理]

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参考文献23

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3楼智美.两自由度弱非线性耦合系统的一阶近似Lie对称性与近似守恒量[J].物理学报,2013,62(22):5-9. 被引量：7
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6楼智美.用Noether定理确定各向同性谐振子的守恒量[J].力学与实践,2003,25(2):72-73. 被引量：5

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Chinese Physics B

2009年第7期

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A new method to obtain approximate symmetry of nonlinear evolution equation from perturbations 被引量：2

参考文献23

同被引文献6

引证文献2

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