This paper is focused on determining the non-negative self-adjoint extensions of a Hamiltonian system using the Kreı̆n-Višik-Birman theory. As an example of this, the non-negative self-adjoint extensions of a fourth-order ODE are determined
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Abstract. We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such ...
The problem of constructing alternative Hamiltonian formulations in the extended Chern–Simons theory...
This paper is focused on determining the non-negative self-adjoint extensions of a Hamiltonian syste...
This paper is focused on determining the non-negative self-adjoint extensions of a Hamiltonian syste...
AbstractThis paper is concerned with self-adjoint extensions for a linear Hamiltonian system with tw...
We compute the deficiency spaces of operators of the form ⊗̂ +⊗̂ , for symmetric and self-adjoint ....
AbstractA set of criteria under which a general non-self-adjoint eigenvalue problem can be transform...
We show that the Aharonov-Bohm Hamiltonian considered on a disc has a four-parameter family of self-...
A well-known tool in conventional (von Neumann) quantum mechanics is the self-adjoint extension tech...
Abstract. We show that the Aharonov-Bohm Hamiltonian considered on a disc has a four-parameter famil...
This paper outlines results recently obtained in the problem of determining when an input-output map...
This paper studies previously developed nonlinear Hilbert adjoint operator theory from a variational...
AbstractIn this paper, the Glazman–Krein–Naimark theory for a class of discrete Hamiltonian systems ...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Abstract. We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such ...
The problem of constructing alternative Hamiltonian formulations in the extended Chern–Simons theory...
This paper is focused on determining the non-negative self-adjoint extensions of a Hamiltonian syste...
This paper is focused on determining the non-negative self-adjoint extensions of a Hamiltonian syste...
AbstractThis paper is concerned with self-adjoint extensions for a linear Hamiltonian system with tw...
We compute the deficiency spaces of operators of the form ⊗̂ +⊗̂ , for symmetric and self-adjoint ....
AbstractA set of criteria under which a general non-self-adjoint eigenvalue problem can be transform...
We show that the Aharonov-Bohm Hamiltonian considered on a disc has a four-parameter family of self-...
A well-known tool in conventional (von Neumann) quantum mechanics is the self-adjoint extension tech...
Abstract. We show that the Aharonov-Bohm Hamiltonian considered on a disc has a four-parameter famil...
This paper outlines results recently obtained in the problem of determining when an input-output map...
This paper studies previously developed nonlinear Hilbert adjoint operator theory from a variational...
AbstractIn this paper, the Glazman–Krein–Naimark theory for a class of discrete Hamiltonian systems ...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Abstract. We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such ...
The problem of constructing alternative Hamiltonian formulations in the extended Chern–Simons theory...
DOI
Add to ORKG