论还原准经典自偶杨-米尔斯方程的完全非局部对称递归算子

IF 1.4 3区 物理与天体物理 Q2 PHYSICS, MATHEMATICAL
Jiřina Jahnová, Petr Vojčák
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引用次数: 0

摘要

摘要 我们介绍了为完全非局部对称性构建递归算子的思想,并将其应用于还原的准经典自偶杨-米尔斯方程。结果发现,所发现的递归算子可以解释为微分函数的无限维矩阵,只需通过矩阵乘法就能作用于非局部对称性的生成向量函数。据我们所知,迄今为止文献中还没有此类递归算子的例子,因此我们的方法是完全创新的。此外,我们还研究了所发现的算子的代数性质,并讨论了所有递归算子集合上的({\mathbb {R}}\) -代数结构,以了解相关方程的完全非局部对称性。最后,我们举例说明了所得到的递归算子对特别选择的完全对称性的作用,并强调了它们与传统使用的递归算子对阴影的作用相比所具有的优势。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On Recursion Operators for Full-Fledged Nonlocal Symmetries of the Reduced Quasi-classical Self-dual Yang–Mills Equation

We introduce the idea of constructing recursion operators for full-fledged nonlocal symmetries and apply it to the reduced quasi-classical self-dual Yang–Mills equation. It turns out that the discovered recursion operators can be interpreted as infinite-dimensional matrices of differential functions which act on the generating vector functions of the nonlocal symmetries simply by matrix multiplication. To the best of our knowledge, there are no other examples of such recursion operators in the literature so far, so our approach is completely innovative. Further, we investigate the algebraic properties of the discovered operators and discuss the \({\mathbb {R}}\)-algebra structure on the set of all recursion operators for full-fledged nonlocal symmetries of the equation in question. Finally, we illustrate the action of the obtained recursion operators on particularly chosen full-fledged symmetries and emphasize their advantages compared to the action of traditionally used recursion operators for shadows.

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来源期刊
Annales Henri Poincaré
Annales Henri Poincaré 物理-物理:粒子与场物理
CiteScore
3.00
自引率
6.70%
发文量
108
审稿时长
6-12 weeks
期刊介绍: The two journals Annales de l''Institut Henri Poincaré, physique théorique and Helvetica Physical Acta merged into a single new journal under the name Annales Henri Poincaré - A Journal of Theoretical and Mathematical Physics edited jointly by the Institut Henri Poincaré and by the Swiss Physical Society. The goal of the journal is to serve the international scientific community in theoretical and mathematical physics by collecting and publishing original research papers meeting the highest professional standards in the field. The emphasis will be on analytical theoretical and mathematical physics in a broad sense.
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