与可积微分方程相关的代数结构

Ensaios Matemáticos Pub Date : 2017-11-28 DOI:10.21711/217504322017/em311

V. Sokolov

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引用次数: 5

摘要

该调查致力于与可积偏微分方程和进化偏微分方程相关的代数结构。在向量空间中，将环代数分解为泰勒级数与互补子代数的直和，给出了Lax表示的描述。给出了互补子代数的实例和相应的可积模型。在双哈密顿方法的框架下，考虑了相容结合代数相关的仿射Dynkin图。揭示了经典椭圆卡罗伽罗-莫泽模型的双哈密顿起源。

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Algebraic structures related to integrable differential equations

The survey is devoted to algebraic structures related to integrable ODEs and evolution PDEs. A description of Lax representations is given in terms of vector space decomposition of loop algebras into a direct sum of Taylor series and a complementary subalgebra. Examples of complementary subalgebras and corresponding integrable models are presented. In the framework of the bi-Hamiltonian approach compatible associative algebras related affine Dynkin diagrams are considered. A bi-Hamiltonian origin of the classical elliptic Calogero-Moser models is revealed.

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Ensaios Matemáticos

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