Topological charge quantization via path integration: An application of the Kustaanheimo-Stiefel transformation [Book Review]

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Foundations of Physics 23 (8):1073-1091 (1993)
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Abstract

The unified treatment of the Dirac monopole, the Schwinger monopole, and the Aharonov-Bohm problem by Barut and Wilson is revisited via a path integral approach. The Kustaanheimo-Stiefel transformation of space and time is utilized to calculate the path integral for a charged particle in the singular vector potential. In the process of dimensional reduction, a topological charge quantization rule is derived, which contains Dirac's quantization condition as a special case. “Everything that is made beautiful and fair and lovely is made for the eye of one who sees.” Jelaluddin Rumi,Mathnawi [I, 2383]

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10.1007/bf00732414

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