Generalized inverse of upper triangular infinite dimensional Hamiltonian operators (Q2854026)
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scientific article; zbMATH DE number 6215984
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Generalized inverse of upper triangular infinite dimensional Hamiltonian operators |
scientific article; zbMATH DE number 6215984 |
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17 October 2013
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Hamiltonian operator
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upper triangular Hamiltonian operator
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Moore-Penrose inverse
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Generalized inverse of upper triangular infinite dimensional Hamiltonian operators (English)
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A closed densely defined operator \(H=[A_{ij}]_{2\times 2}\) is called Hamiltonian operator if \(A_{12}\) and \(A_{21}\) are self-adjoint and \(A_{11}=-A_{22}^*\) is densely defined. If \(A_{21}=0\), then \(H\) is called upper triangular Hamiltonian operator. In the main part of this paper it is proved that the Moore-Penrose inverse of a Hamiltonian operator is a Hamiltonian operator. Also, the Moore-Penrose inverse of a class of upper triangular Hamiltonian operators is introduced.
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