Add to ORKGIn [4] we gave a characterization of the generalized resolvents of a symmetric operator with arbitrary defect numbers in a Pontrjagin space II,. The purpose of this note is to extend this and related results to symmetric linear relations in I1,. As was pointed out in [5], the need for this kind of extension arises e.g. in con
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
The concept of canonical extension of Hermitian operators has been recently introduced by A. Kuzhel....
Kreĭn’s formula provides a parametrization of the generalized resolvents and Štraus extensions of a ...
We study module spaces for linear relations (multi-valued operators) in a Hilbert space. The defect ...
generalized resolvents of symmetric operators of defect one with finitely many negative square
We introduce triplet spaces for symmetric relations with defect index (1, 1) in a Pon-tryagin space....
This paper continues the study of linear relations in an indefinite inne-lr product space begun in [...
A new proof is provided for the Krein formula for generalized resolvents in the context of symmetric...
AbstractKreĭn's formula provides a parametrization of the generalized resolvents and Štraus extensio...
In this paper we give an analogue of Krein’s formula on the description of generalized resolvents of...
The generalized resolvents for a certain class of perturbed symmetric operators with equal and finit...
The generalized resolvents for a certain class of perturbed symmetric operators with equal and finit...
Let H be an n-dimensional space, which is equipped with a positive semidefinite inner product with a...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
Let S be a symmetric operator with finite and equal defect numbers in the Hilbert space . We study t...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
The concept of canonical extension of Hermitian operators has been recently introduced by A. Kuzhel....
Kreĭn’s formula provides a parametrization of the generalized resolvents and Štraus extensions of a ...
We study module spaces for linear relations (multi-valued operators) in a Hilbert space. The defect ...
generalized resolvents of symmetric operators of defect one with finitely many negative square
We introduce triplet spaces for symmetric relations with defect index (1, 1) in a Pon-tryagin space....
This paper continues the study of linear relations in an indefinite inne-lr product space begun in [...
A new proof is provided for the Krein formula for generalized resolvents in the context of symmetric...
AbstractKreĭn's formula provides a parametrization of the generalized resolvents and Štraus extensio...
In this paper we give an analogue of Krein’s formula on the description of generalized resolvents of...
The generalized resolvents for a certain class of perturbed symmetric operators with equal and finit...
The generalized resolvents for a certain class of perturbed symmetric operators with equal and finit...
Let H be an n-dimensional space, which is equipped with a positive semidefinite inner product with a...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
Let S be a symmetric operator with finite and equal defect numbers in the Hilbert space . We study t...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
The concept of canonical extension of Hermitian operators has been recently introduced by A. Kuzhel....
Kreĭn’s formula provides a parametrization of the generalized resolvents and Štraus extensions of a ...