On Dirac operators in R3 with electrostatic and Lorentz scalar δ-shell interactions

Abstract

In this article Dirac operators Aη, τ coupled with combinations of electrostatic and Lorentz scalar δ-shell interactions of constant strength η and τ, respectively, supported on compact surfaces ⊂ R3 are studied. In the rigorous definition of these operators the δ-potentials are modelled by coupling conditions at . In the proof of the self-adjointness of Aη, τ a Krein-type resolvent formula and a Birman-Schwinger principle are obtained. With their help a detailed study of the qualitative spectral properties of Aη, τ is possible. In particular, the essential spectrum of Aη, τ is determined, it is shown that at most finitely many discrete eigenvalues can appear, and several symmetry relations in the point spectrum are obtained. Moreover, the nonrelativistic limit of Aη, τ is computed and it is discussed that for some special interaction strengths Aη, τ is decoupled to two operators acting in the domains with the common boundary .