TL;DR
This paper extends the MICZ-Kepler problems, which generalize the classical Kepler problem, to all dimensions higher than two, providing a comprehensive mathematical framework for these higher-dimensional systems.
Contribution
The paper introduces a construction and analysis of quantum MICZ-Kepler problems in all dimensions greater than two, broadening the understanding of these generalized systems.
Findings
Successful formulation of MICZ-Kepler problems in all higher dimensions
Mathematical analysis of properties in higher-dimensional cases
Extension from previously known 3D and 5D cases
Abstract
The Kepler problem is a physical problem about two bodies which attract each other by a force proportional to the inverse square of the distance. The MICZ-Kepler problems are its natural cousins and have been previously generalized from dimension three to dimension five. In this paper, we construct and analyze the (quantum) MICZ-Kepler problems in all dimensions higher than two.
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