Boundary Data Maps for Schrödinger Operators on a Compact Interval

Abstract: Abstract. We provide a systematic study of boundary data maps, that is, 2 × 2 matrix-valued Dirichlet-to-Neumann and more generally, Robin-to-Robin maps, associated with one-dimensional Schrödinger operators on a compact interval [0, R] with separated boundary conditions at 0 and R. Most of our results are formulated in the non-self-adjoint context.Our principal results include explicit representations of these boundary data maps in terms of the resolvent of the underlying Schrödinger operator and the associat… Show more

“…In addition, we note that (4.2) and (4.9) imply [7]). In this paper we will pursue an alternative route based on Krein's resolvent formula in Corollary 4.12.…”

“…Unfortunately, the computation of S(A ′′ , B ′′ , A ′′′ , B ′′′ ) −1 appears to be too elaborate to pursue explicit formulas for (4.42). (The special case of separated boundary conditions, however, is sufficiently simple, and in this case S(A ′′ , B ′′ , A ′′′ , B ′′′ ) −1 was explicitly computed in [7]). We now turn our attention to a derivation of a representation for the general boundary data map Λ A ′ ,B ′ A,B (z) in terms of the resolvent (H A,B − zI (a,b) ) −1 and the boundary trace map γ A ′ ,B ′ (cf.…”

“…For A, B ∈ C 2×2 satisfying (2.7), assume that U A,B : N + → N − denotes the unique linear isometric isomorphism with 7) guaranteed to exist by Theorem 6.1 (ii). Suppose that U A,B denotes the matrix representation of U A,B with respect to the bases B ± .…”

“…The principal theme developed in this paper concerns a detailed treatment of generalizations of the spectral parameter dependent Dirichlet-to-Neumann map for (three-coefficient) Sturm-Liouville operators on the finite interval (a, b) to that for all self-adjoint boundary conditions. While the earlier treatments of boundary data maps in [7] and [12] focused on the special case of separated boundary conditions at a and b, this paper now treats the case of all self-adjoint boundary conditions in a unified matter. Applications of the formalism discussed in this paper include the precise connections with Krein's resolvent formula for self-adjoint extensions of the underlying minimal Sturm-Liouville operator (parametrized in terms of boundary conditions); in particular, we will describe in detail the connections with Krein's extension of the minimal operator.…”

Boundary data maps and Krein's resolvent formula for Sturm-Liouville operators on a finite interval

“…In addition, we note that (4.2) and (4.9) imply [7]). In this paper we will pursue an alternative route based on Krein's resolvent formula in Corollary 4.12.…”

“…Unfortunately, the computation of S(A ′′ , B ′′ , A ′′′ , B ′′′ ) −1 appears to be too elaborate to pursue explicit formulas for (4.42). (The special case of separated boundary conditions, however, is sufficiently simple, and in this case S(A ′′ , B ′′ , A ′′′ , B ′′′ ) −1 was explicitly computed in [7]). We now turn our attention to a derivation of a representation for the general boundary data map Λ A ′ ,B ′ A,B (z) in terms of the resolvent (H A,B − zI (a,b) ) −1 and the boundary trace map γ A ′ ,B ′ (cf.…”

“…For A, B ∈ C 2×2 satisfying (2.7), assume that U A,B : N + → N − denotes the unique linear isometric isomorphism with 7) guaranteed to exist by Theorem 6.1 (ii). Suppose that U A,B denotes the matrix representation of U A,B with respect to the bases B ± .…”

“…The principal theme developed in this paper concerns a detailed treatment of generalizations of the spectral parameter dependent Dirichlet-to-Neumann map for (three-coefficient) Sturm-Liouville operators on the finite interval (a, b) to that for all self-adjoint boundary conditions. While the earlier treatments of boundary data maps in [7] and [12] focused on the special case of separated boundary conditions at a and b, this paper now treats the case of all self-adjoint boundary conditions in a unified matter. Applications of the formalism discussed in this paper include the precise connections with Krein's resolvent formula for self-adjoint extensions of the underlying minimal Sturm-Liouville operator (parametrized in terms of boundary conditions); in particular, we will describe in detail the connections with Krein's extension of the minimal operator.…”

Boundary data maps and Krein's resolvent formula for Sturm-Liouville operators on a finite interval

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The aim of this paper is twofold: On one hand we discuss an abstract approach to symmetrized Fredholm perturbation determinants and an associated trace formula for a pair of operators of positive-type, extending a classical trace formula.On the other hand, we continue a recent systematic study of boundary data maps in [14], that is, 2 × 2 matrix-valued Dirichlet-to-Neumann and more generally, Robin-to-Robin maps, associated with one-dimensional Schrödinger operators on a compact interval [0, R] with separated boundary conditions at 0 and R. One of the principal new results in this paper reduces an appropriately symmetrized (Fredholm) perturbation determinant to the 2 × 2 determinant of the underlying boundary data map. In addition, as a concrete application of the abstract approach in the first part of this paper, we establish the trace formula for resolvent differences of self-adjoint Schrödinger operators corresponding to different (separated) boundary conditions in terms of boundary data maps.

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Symmetrized perturbation determinants and applications to boundary data maps and Krein-type resolvent formulas

Computing Traces, Determinants, and $$\zeta $$-Functions for Sturm–Liouville Operators: A Survey