Non-relativistic limit of Dirac Hamiltonians with Aharonov-Bohm fields

Abstract

We characterise the families of self-adjoint Dirac and Schr\"odinger operators with Aharonov-Bohm magnetic field, and we exploit the non-relativistic limit of infinite light speed to connect the former to the latter. The limit consists of the customary removal of the rest energy and of a suitable scaling, with the light speed, of the short-scale boundary condition of self-adjointness. This ensures that the scattering length of the Aharonov-Bohm interaction is preserved along the limit. Noteworthy is the fact that the whole family of Dirac-AB operators is mapped, in the non-relativistic limit, into the physically relevant sub-family of s-wave, angular-momentum-commuting, Schr\"o\-dinger-AB Hamiltonians with relativistic Dirac approximants.

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