Integrable extensions of two-center Coulomb systems

Francisco Correa, Octavio Quintana
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Abstract

In this paper, we investigate new integrable extensions of two-center Coulomb systems. We study the most general $n$-dimensional deformation of the two-center problem by adding arbitrary functions supporting second order commuting conserved quantities. The system is superintegrable for $n>4$ and, for certain choices of the arbitrary functions, reduces to known models previously discovered. Then, based on this extended system, we introduce an additional integrable generalisation involving Calogero interactions for $n=3$. In all examples, including the two-center problem, we explicitly present the complete list of Liouville integrals in terms of second-order integrals of motion.
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双中心库仑系统的可积扩展
本文研究了两中心库仑系统的新的可积扩展。通过加入支持二阶可交换守恒量的任意函数,研究了双中心问题最一般的n维变形。当n>4时,系统是可超积的,对于任意函数的某些选择,系统可以简化为已知的模型。然后,在此扩展系统的基础上,我们引入了一个额外的可积广义,涉及到$n=3$的Calogero相互作用。在包括双中心问题在内的所有例子中,我们都明确地给出了用运动的二阶积分表示的Liouville积分的完整列表。
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