Generalized Kaluza-Klein monopole, quadratic algebras and ladder operators

TL;DR

This paper introduces a generalized Kaluza-Klein monopole system, solving its quantum superintegrable equations on a Euclidean Taub-NUT manifold, and analyzes its algebraic structure and energy spectrum using quadratic algebras and ladder operators.

Contribution

It extends the Kaluza-Klein monopole model, providing new algebraic methods and explicit solutions for the energy spectrum in a superintegrable quantum system.

Findings

Explicit solutions for the Schrödinger equation in spherical and parabolic coordinates.

Construction of quadratic algebra and realization via deformed oscillator algebra.

Derivation of the energy spectrum using algebraic and ladder operator methods.

Abstract

We present a generalized Kaluza-Klein monopole system. We solve this quantum superintegrable systems on a Euclidean Taub Nut manifold using the separation of variables of the corresponding Schroedinger equation in spherical and parabolic coordinates. We present the integrals of motion of this system, the quadratic algebra generated by these integrals, the realization in term of a deformed oscillator algebra using the Daskaloyannis construction and the energy spectrum. The structure constants and the Casimir operator are functions not only of the Hamiltonian but also of other two integrals commuting with all generators of the quadratic algebra and forming an Abelian subalgebra. We present an other algebraic derivation of the energy spectrum of this system using the factorization method and ladder operators.