Add to ORKGA description of all exit space extensions with finitely many negative squares of a symmetric operator of defect one is given via Krein’s formula. As one of the main results an exact characterization of the number of negative squares in terms of a fixed canonical extension and the behaviour of a function t (that determines the exit space extension in Krein’s formula) at zero and at infinity is obtained. To this end the class of matrix valued D k n×n -functions is introduced and, in particular, the properties of the inverse of a certain D k 2×2 -function which is closely connected with the spectral properties of the exit space extensions with finitely many negative squares is investigated in detail. Among the main tools here are the analytic...
Krein's formula provides a parametrization of the generalized resolvents and Straus extensions of a ...
For a class of $\lambda$-dependent boundary value problems where a local variant of generalized Neva...
The famous M.G. Kreın’s extension theory of nonnegative operators is being presented in elementary t...
A description of all exit space extensions with finitely many negative squares of a symmetric operat...
Let à be a self-adjoint extension in K of a fixed symmetric operator A in K ⊆ K. Ananalytic characte...
AbstractThe number of negative squares of all self-adjoint extensions of a simple symmetric operator...
The classical Krein-Naimark formula establishes a one-to-one correspondence between the generalized ...
We consider a class of boundary value problems for Sturm-Liouville operators with an indefinite weig...
Let A and B be selfadjoint operators in a Krein space. Assume that the resolvent difference of A and...
We revise Krein's extension theory of positive symmetric operators. Our approach using factorization...
We present explicit realizations in terms of self-adjoint operators and linear relations for a non-z...
AbstractGiven a self-adjoint operator A:D(A)⊆H→H and a continuous linear operator τ:D(A)→X with Rang...
The Friedrichs extension and the Krein extension of a positive operator in a Krein space are charact...
We revisit the Krein-von Neumann extension in the case where the underlying symmetric operator is st...
For a special class 2 × 2-matrix functions Ω operator representations of Ω(z) and Ω^(z) := - Ω(z) -1...
Krein's formula provides a parametrization of the generalized resolvents and Straus extensions of a ...
For a class of $\lambda$-dependent boundary value problems where a local variant of generalized Neva...
The famous M.G. Kreın’s extension theory of nonnegative operators is being presented in elementary t...
A description of all exit space extensions with finitely many negative squares of a symmetric operat...
Let à be a self-adjoint extension in K of a fixed symmetric operator A in K ⊆ K. Ananalytic characte...
AbstractThe number of negative squares of all self-adjoint extensions of a simple symmetric operator...
The classical Krein-Naimark formula establishes a one-to-one correspondence between the generalized ...
We consider a class of boundary value problems for Sturm-Liouville operators with an indefinite weig...
Let A and B be selfadjoint operators in a Krein space. Assume that the resolvent difference of A and...
We revise Krein's extension theory of positive symmetric operators. Our approach using factorization...
We present explicit realizations in terms of self-adjoint operators and linear relations for a non-z...
AbstractGiven a self-adjoint operator A:D(A)⊆H→H and a continuous linear operator τ:D(A)→X with Rang...
The Friedrichs extension and the Krein extension of a positive operator in a Krein space are charact...
We revisit the Krein-von Neumann extension in the case where the underlying symmetric operator is st...
For a special class 2 × 2-matrix functions Ω operator representations of Ω(z) and Ω^(z) := - Ω(z) -1...
Krein's formula provides a parametrization of the generalized resolvents and Straus extensions of a ...
For a class of $\lambda$-dependent boundary value problems where a local variant of generalized Neva...
The famous M.G. Kreın’s extension theory of nonnegative operators is being presented in elementary t...