On Dirac operators with electrostatic δ-shell interactions of critical strength

Abstract

In this paper we prove that the Dirac operator Aη with an electrostatic δ-shell interaction of critical strength η = 2 supported on a C2-smooth compact surface is self-adjoint in L2(R3;C4), we describe the domain explicitly in terms of traces and jump conditions in H-1/2(; C4), and we investigate the spectral properties of Aη. While the non-critical interaction strengths η = 2 have received a lot of attention in the recent past, the critical case η = 2 remained open. Our approach is based on abstract techniques in extension theory of symmetric operators, in particular, boundary triples and their Weyl functions.