范分代数在单极子物理中的应用

Communications in Physics Pub Date : 2021-04-16 DOI:10.15625/0868-3166/15905

D. Le, Van-Hoang Le

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引用次数: 0

摘要

讨论了一些赋范除法代数R,C,H,O在单极子物理和MICZ-Kepler问题中的应用。更具体地说，我们将简要回顾应用赋范除法代数解释Dirac、Yang和SO(8)单极子存在性的一些结果。这些单极子也出现在各向同性谐振子之间的对偶性和MICZ-Kepler问题的检验中。我们也会用广义的Hurwitz变换来回顾一些关于九维MICZ-Kepler问题的最新结果。

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Normed Division Algebras Application to the Monopole Physics

We review some normed division algebras R,C,H,O applications to the monopole physics and MICZ-Kepler problems. More specifically, we will briefly review some results in applying the normed division algebras to interpret the existence of Dirac, Yang, and SO(8) monopoles. These monopoles also appear during the examination of the duality between isotropic harmonic oscillators and the MICZ-Kepler problems. We also revisit some of our newest results in the ninedimensional MICZ-Kepler problem using the generalized Hurwitz transformation.

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Communications in Physics

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