Generalized interactions supported on hypersurfaces

Abstract: Abstract. We analyze a family of singular Schrödinger operators with local singular interactions supported by a hypersurface Σ ⊂ R n , 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 hypersurfa… Show more

“…The construction of the operator ∆ θ with semi-transparent boundary condition of δ ′ -type provided in Theorem 5.15 extend, as regards the regularity of the boundary and/or the class of admissible strength functions, previous constructions given in [6], [26], [15]. Asymptotic completeness for the scattering couple (∆, ∆ θ ) provided in Theorem 5.15 extend results on existence and completeness given, whenever the boundary is smooth and θ is bounded, in [6] and [26].…”

Asymptotic completeness and S-matrix for singular perturbations

“…The construction of the operator ∆ θ with semi-transparent boundary condition of δ ′ -type provided in Theorem 5.15 extend, as regards the regularity of the boundary and/or the class of admissible strength functions, previous constructions given in [6], [26], [15]. Asymptotic completeness for the scattering couple (∆, ∆ θ ) provided in Theorem 5.15 extend results on existence and completeness given, whenever the boundary is smooth and θ is bounded, in [6] and [26].…”

Asymptotic completeness and S-matrix for singular perturbations

“…In this section we give a rigorous definition of the operators A 0 and A F and obtain a Kreȋn's type formula for their resolvents. We remark that a rigorous definition of the operators A 0 and A F can also be obtained, more directly, starting from the associated quadratic form, see, e.g., [4,9,18]. However, since we shall extensively use Kreȋn's type resolvent formulae, we prefer to use them also to characterize the domain and action of the operators A 0 and A F .…”

“…the resolvent of A ∅ ) (see Theorem 3.4). Let us remark here that the operator A F could be equivalently defined by quadratic form methods (see, e.g., [4,9,18] and references therein); however, in order to study the Limiting Absorption Principle (LAP for short) and the Scattering Matrix, one needs a convenient resolvent formula. One more important remark about our use of resolvent formulae is the following: proceeding as in [15], one could try to provide a resolvent formula of A F expressed directly in terms of A 0 ; however this would imply the use of trace (evaluation) operators in the operator domain of A 0 , and these are less well-behaved than in the Sobolev space H 2 (R 3 ), the self-adjointness domain of A ∅ (in particular is not clear what should be the correct trace space).…”

Scattering from local deformations of a semitransparent plane

“…The same technique can be used to reprove the optimization result in [EHL06] on δ-interactions without making use of the Birman-Schwinger principle. In fact, the method seems to be applicable for a larger sub-class of general fourparametric boundary conditions, considered in [ER16]. One has only to ensure that the lowest spectral point is indeed a negative eigenvalue and that the corresponding ground-state is real-valued and radially symmetric for the case of the interaction supported on a circle.…”

Spectral isoperimetric inequalities for singular interactions on open arcs