Let $L_{0}$ be a closed linear nonnegative (probably, positively defined) relation ("multivalued operator") in a complex Hilbert space $H$. In terms of the so called boundary value spaces (boundary triples) and corresponding Weyl functions and Kochubei-Strauss characteristic ones, the Friedrichs (hard) and Neumann-Krein (soft) extensions of $L_{0}$ are constructed. It should be noted that every nonnegative linear relation $L_{0}$ in a Hilbert space $H$ has two extremal nonnegative selfadjoint extensions: the Friedrichs extension $L_{F}$ and the Neumann-Krein extension $L_{K},$ satisfying the following property: $$(\forall \varepsilon > 0) (L_{F} + \varepsilon 1)^{-1} \leq (\widetilde{L} + \varepsilon 1)^{-1} \leq (L_{K} + \varepsilon 1)^...
AbstractAssume that the differential operator −DpD+q in L2(0,∞) has 0 as a regular point and that th...
AbstractThe second-order singular elliptic differential operator T0u ≔ 1k{∑ Ds(astDtu) + qu} with Ds...
The paper is a continuation of Part I and contains several further results on generalized boundary t...
Let $L$ and $L_{0}$, where $L$ is an expansion of $L_{0}$, be closed linear relations (multivalued o...
The famous M.G. Kreın’s extension theory of nonnegative operators is being presented in elementary t...
AbstractWe show that for a positive linear operator acting in ℓ2 and defined fromanxn+1+bnxn+an-1xn-...
The selfadjoint extensions of a closed linear relation R from a Hilbert space H1 to a Hilbert space ...
AbstractFor a symmetric operator or relation A with infinite deficiency indices in a Hilbert space w...
This thesis presents solutions to certain problems in the extension theory in Hilbert spaces. Basica...
We revisit the Krein-von Neumann extension in the case where the underlying symmetric operator is st...
The main aim of this paper is to generalize the classical concept of a positive operator, and to dev...
International audienceWe give an explicit description of all minimal self-adjoint extensions of a de...
AbstractKreĭn's formula provides a parametrization of the generalized resolvents and Štraus extensio...
The Kreĭn-von Neumann and the Friedrichs extensions of a nonnegative linear operator or relation (i....
AbstractThe classical Weyl–von Neumann theorem states that for any self-adjoint operator A0 in a sep...
AbstractAssume that the differential operator −DpD+q in L2(0,∞) has 0 as a regular point and that th...
AbstractThe second-order singular elliptic differential operator T0u ≔ 1k{∑ Ds(astDtu) + qu} with Ds...
The paper is a continuation of Part I and contains several further results on generalized boundary t...
Let $L$ and $L_{0}$, where $L$ is an expansion of $L_{0}$, be closed linear relations (multivalued o...
The famous M.G. Kreın’s extension theory of nonnegative operators is being presented in elementary t...
AbstractWe show that for a positive linear operator acting in ℓ2 and defined fromanxn+1+bnxn+an-1xn-...
The selfadjoint extensions of a closed linear relation R from a Hilbert space H1 to a Hilbert space ...
AbstractFor a symmetric operator or relation A with infinite deficiency indices in a Hilbert space w...
This thesis presents solutions to certain problems in the extension theory in Hilbert spaces. Basica...
We revisit the Krein-von Neumann extension in the case where the underlying symmetric operator is st...
The main aim of this paper is to generalize the classical concept of a positive operator, and to dev...
International audienceWe give an explicit description of all minimal self-adjoint extensions of a de...
AbstractKreĭn's formula provides a parametrization of the generalized resolvents and Štraus extensio...
The Kreĭn-von Neumann and the Friedrichs extensions of a nonnegative linear operator or relation (i....
AbstractThe classical Weyl–von Neumann theorem states that for any self-adjoint operator A0 in a sep...
AbstractAssume that the differential operator −DpD+q in L2(0,∞) has 0 as a regular point and that th...
AbstractThe second-order singular elliptic differential operator T0u ≔ 1k{∑ Ds(astDtu) + qu} with Ds...
The paper is a continuation of Part I and contains several further results on generalized boundary t...