Superintegrable systems associated to commutants of Cartan subalgebras in enveloping algebras (2406.01958v1)

Abstract: We provide a classification and explicit formulas for the elements that span the centralizer of Cartan subalgebras of complex semisimple Lie algebras of non-exceptional type in their universal enveloping algebra, and show that these generate polynomial (Poisson) algebras. The precise structure for the case of rank three simple Lie algebras is provided, and the inclusion relations between the corresponding polynomial algebras illustrated. We develop the ideas of constructing algebraic superintegrable systems and their integrals from the generators of the centralizer subalgebras and their symmetry algebra. In particular, we present explicitly one example the superintegrable system corresponding to the Cartan centralizer of $\mathfrak{so}(6,\mathbb{C})$.