TY - JOUR
T1 - Self-adjoint Dirac operators on domains in R^3
AU - Behrndt, Jussi
AU - Holzmann, Markus
AU - Mas, Albert
PY - 2020
Y1 - 2020
N2 - In this paper, the spectral and scattering properties of a family of self-adjoint Dirac operators in L2(Ω;C4), where Ω⊂R3 is either a bounded or an unbounded domain with a compact C2-smooth boundary, are studied in a systematic way. These operators can be viewed as the natural relativistic counterpart of Laplacians with boundary conditions as of Robin type. Our approach is based on abstract boundary triple techniques from extension theory of symmetric operators and a thorough study of certain classes of (boundary) integral operators, that appear in a Krein-type resolvent formula. The analysis of the perturbation term in this formula leads to a description of the spectrum and a Birman–Schwinger principle, a qualitative understanding of the scattering properties in the case that Ω is an exterior domain, and corresponding trace formulas.
AB - In this paper, the spectral and scattering properties of a family of self-adjoint Dirac operators in L2(Ω;C4), where Ω⊂R3 is either a bounded or an unbounded domain with a compact C2-smooth boundary, are studied in a systematic way. These operators can be viewed as the natural relativistic counterpart of Laplacians with boundary conditions as of Robin type. Our approach is based on abstract boundary triple techniques from extension theory of symmetric operators and a thorough study of certain classes of (boundary) integral operators, that appear in a Krein-type resolvent formula. The analysis of the perturbation term in this formula leads to a description of the spectrum and a Birman–Schwinger principle, a qualitative understanding of the scattering properties in the case that Ω is an exterior domain, and corresponding trace formulas.
U2 - 10.1007/s00023-020-00925-1
DO - 10.1007/s00023-020-00925-1
M3 - Article
VL - 21
SP - 2681
EP - 2735
JO - Annales Henri Poincaré
JF - Annales Henri Poincaré
SN - 1424-0637
ER -