\(J\)-self-adjoint extensions for a class of discrete linear Hamiltonian systems
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Publication:2319244
DOI10.1155/2013/904976zbMath1470.47019OpenAlexW2120459472WikidataQ58917702 ScholiaQ58917702MaRDI QIDQ2319244
Publication date: 16 August 2019
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2013/904976
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Friedrichs extensions of a class of discrete Hamiltonian systems with one singular endpoint, \(\mathcal{J}\)-self-adjoint extensions of a class of Hamiltonian differential systems
Cites Work
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- Defect indices and definiteness conditions for a class of discrete linear Hamiltonian systems
- The theory for \(J\)-Hermitian subspaces in a product space
- The theory of J-selfadjoint extensions of J-symmetric operators
- Self-adjoint extensions for second-order symmetric linear difference equations
- Self-adjoint extensions for linear Hamiltonian systems with two singular endpoints
- Characterization of domains of self-adjoint ordinary differential operators
- Spectral theory of ordinary differential operators
- On J-selfadjoint extensions of J-symmetric ordinary differential operators
- Self-adjoint extensions of symmetric subspaces
- Selfadjoint subspaces and eigenfunction expansions for ordinary differential subspaces
- On the deficiency indices and self-adjointness of symmetric Hamiltonian systems
- On \(M\)-functions and operator theory for non-self-adjoint discrete Hamiltonian systems
- Self-adjoint extensions for discrete linear Hamiltonian systems
- Weyl--Titchmarsh theory for a class of discrete linear Hamiltonian systems
- Self‐adjoint extensions for singular linear Hamiltonian systems
- On the self-adjoint extensions of symmetric ordinary differential operators with middle deficiency indices
- Selfadjoint subspace extensions of nondensely defined symmetric operators
- Extension theory of formally normal and symmetric subspaces
