The Prolongation Structures for the System of the Reaction-Diffusion Type

The Prolongation Structures for the System of the Reaction-Diffusion Type

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摘要 Equations of the reaction-diffusion type are very well known and have been extensively studied in many research areas. In this paper, the prolongation structures for the system of the reaction-diffusion type are investigated from theory of coverings. The realizations and the classifications of the one-dimensional coverings of the system are researched. And the corresponding conservation law of the one-dimensional Abelian coverings is concluded, which is closely connected with the symmetry of the system by Noether theorem. Equations of the reaction-diffusion type are very well known and have been extensively studied in many research areas. In this paper, the prolongation structures for the system of the reaction-diffusion type are investigated from theory of coverings. The realizations and the classifications of the one-dimensional coverings of the system are researched. And the corresponding conservation law of the one-dimensional Abelian coverings is concluded, which is closely connected with the symmetry of the system by Noether theorem.

作者 Xiaojuan Duan

机构地区 Faculty of Applied Mathematics

出处《Journal of Applied Mathematics and Physics》 2017年第1期92-100,共9页 应用数学与应用物理（英文）

关键词 PROLONGATION Structure REACTION-DIFFUSION REALIZATION ABELIAN COVERING Prolongation Structure Reaction-Diffusion Realization Abelian Covering

分类号 O1 [理学—基础数学]

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共引文献2

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2田野,张峰,格日措毛.离散的修正海森堡铁磁链方程的研究[J].河北大学学报（自然科学版）,2011,31(3):244-248.

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Journal of Applied Mathematics and Physics

2017年第1期

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The Prolongation Structures for the System of the Reaction-Diffusion Type

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