Add to ORKGA space of boundary values is constructed for symmetric Schrodinger operators with matrix potentials on the half-line and on the whole line. A description of all maximal dissipative, self-adjoint and other extensions of such operators is given in terms of boundary conditions
We provide a simple recipe for obtaining all self-adjoint extensions, together with their resolvent,...
AbstractFor a symmetric operator or relation A with infinite deficiency indices in a Hilbert space w...
A space of boundary values is constructed for minimal symmetric regular and singular q-Sturm– Liouv...
AbstractThe self-adjoint subspace extensions of a possibly nondensely defined symmetric operator in ...
summary:A space of boundary values is constructed for the minimal symmetric operator generated by an...
AbstractThe notion of a maximally nondensely defined symmetric operator or relation is introduced an...
The notion of a maximally nondensely defined symmetric operator or relation is introduced and charac...
AbstractA space of boundary values is constructed for minimal symmetric operator, generated by discr...
Given a densely defined skew-symmetric operators A 0 on a real or complex Hilbert space V , we param...
AbstractA space of boundary values is constructed for minimal symmetric Dirac operator in LA2((−∞,∞)...
This paper completes the review of the theory of self-adjoint extensions of symmetric operators for ...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
In this paper, we study matrix-valued Hahn–Sturm–Liouville equations. We give an existence and uniqu...
A space of boundary values is constructed for symmetric discrete Dirac operators in 2A(Z;C2)(Z: = {0...
We provide a simple recipe for obtaining all self-adjoint extensions, together with their resolvent,...
AbstractFor a symmetric operator or relation A with infinite deficiency indices in a Hilbert space w...
A space of boundary values is constructed for minimal symmetric regular and singular q-Sturm– Liouv...
AbstractThe self-adjoint subspace extensions of a possibly nondensely defined symmetric operator in ...
summary:A space of boundary values is constructed for the minimal symmetric operator generated by an...
AbstractThe notion of a maximally nondensely defined symmetric operator or relation is introduced an...
The notion of a maximally nondensely defined symmetric operator or relation is introduced and charac...
AbstractA space of boundary values is constructed for minimal symmetric operator, generated by discr...
Given a densely defined skew-symmetric operators A 0 on a real or complex Hilbert space V , we param...
AbstractA space of boundary values is constructed for minimal symmetric Dirac operator in LA2((−∞,∞)...
This paper completes the review of the theory of self-adjoint extensions of symmetric operators for ...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
The Kreĭn–Naĭmark formula provides a parametrization of all selfadjoint exit space extensions of a (...
In this paper, we study matrix-valued Hahn–Sturm–Liouville equations. We give an existence and uniqu...
A space of boundary values is constructed for symmetric discrete Dirac operators in 2A(Z;C2)(Z: = {0...
We provide a simple recipe for obtaining all self-adjoint extensions, together with their resolvent,...
AbstractFor a symmetric operator or relation A with infinite deficiency indices in a Hilbert space w...
A space of boundary values is constructed for minimal symmetric regular and singular q-Sturm– Liouv...