Gauge invariant hydrogen atom Hamiltonian
Wei-Min Sun, Xiang-Song Chen, Xiao-Fu Lu, Fan Wang
TL;DR
This paper derives a gauge invariant hydrogen atom Hamiltonian by separating electromagnetic potentials, demonstrating that the energy eigenvalues are gauge independent and consistent with the Dirac equation.
Contribution
It introduces a gauge invariant Hamiltonian for the hydrogen atom that differs from the Dirac Hamiltonian and confirms its gauge independence and physical consistency.
Findings
The gauge invariant Hamiltonian is explicitly derived for the hydrogen atom.
Energy eigenvalues are shown to be gauge independent.
The eigenfunctions can be chosen to satisfy the Dirac equation.
Abstract
For quantum mechanics of a charged particle in a classical external electromagnetic field, there is an apparent puzzle that the matrix element of the canonical momentum and Hamiltonian operators is gauge dependent. A resolution to this puzzle is recently provided by us in [2]. Based on the separation of the electromagnetic potential into pure gauge and gauge invariant parts, we have proposed a new set of momentum and Hamiltonian operators which satisfy both the requirement of gauge invariance and the relevant commutation relations. In this paper we report a check for the case of the hydrogen atom problem: Starting from the Hamiltonian of the coupled electron, proton and electromagnetic field, under the infinite proton mass approximation, we derive the gauge invariant hydrogen atom Hamiltonian and verify explicitly that this Hamiltonian is different from the Dirac Hamiltonian, which is…
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