Generalized interactions supported on hypersurfaces

We analyze a family of singular Schrödinger operators with local singular interactions supported by a hypersurface Σ ⊂ ℝⁿ, n ≥ 2, being the boundary of a Lipschitz domain, bounded or unbounded, not necessarily connected. At each point of Σ the interaction is characterized by four real parameters, the earlier studied case of δ- and δ'-interactions being particular cases. We discuss spectral properties of these operators and derive operator inequalities between those referring to the same hypersurface but different couplings and describe their implications for spectral properties.

Subjects

Mathematical Physics

Mathematics - Analysis of PDEs

Mathematics - Mathematical Physics

Mathematics - Spectral Theory

Quantum Physics

Options

Generalized interactions supported on hypersurfaces