Abstract
The one-dimensional Dirac operator with a singular interaction term which is formally given by A⊗|δ0〉〈δ0|, where A is an arbitrary 2×2 matrix and δ0 stands for the Dirac distribution, is introduced as a closed not necessarily self-adjoint operator. We study its spectral properties, find its non-relativistic limit and also address the question of regular approximations. In particular, we show that, contrary to the case of local approximations, for non-local approximating potentials, coupling constants are not renormalized in the limit.
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