Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1, 1), and let A be some of its canonical selfadjoint extensions. According to Krein's formula, to S and A corresponds a so-called Q-function from the Nevanlinna class N. In this note we show to which subclasses N-gamma of N the Q-functions corresponding to S and its canonical selfadjoint extensions belong and specify the Q-functions of the generalized Friedrichs and Krein-von Neumann extensions. A result of L. DE BRANGES implies that to each function Q is an element of N there corresponds a unique Hamiltonian H such that Q is the Titchmarsh-Weyl coefficient of the two-dimensional canonical system Jy' = -zHy on [0,infinity) where Weyl's limit ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
Abstract. If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1,...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1, 1) and on...
Abstract. If the Q-function Q corresponding to a closed symmetric operator S with defect numbers (1,...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...
Let S be a closed symmetric operator with defect numbers (1, 1) in a Hilbert space h and let A be a ...