Article
Parametrization of Scale-Invariant Self-Adjoint Extensions of Scale-Invariant Symmetric Operators
Methods of Functional Analysis and Topology
Abstract
On a Hilbert space H, we consider a symmetric scale-invariant operator with equal defect numbers. It is assumed that the operator has at least one scale invariant self-adjoint extension in H. We prove that there is a one-to-one correspondence between (generalized) resolvents of scale-invariant extensions and solutions of some functional equation. Two examples of Dirac-type operators are considered.
Department(s)
Mathematics and Statistics
Keywords and Phrases
- Generalized resolvents,
- Scale-invariant operator,
- Self-adjoint extension,
- Symmetric operator
Document Type
Article - Journal
Document Version
Final Version
File Type
text
Language(s)
English
Publication Date
1-1-2018
Publication Date
01 Jan 2018
Disciplines
Citation Information
Miron B. Bekker, Martin Bohner, Alexander P. Ugol'nikov and Hristo Voulov. "Parametrization of Scale-Invariant Self-Adjoint Extensions of Scale-Invariant Symmetric Operators" Methods of Functional Analysis and Topology Vol. 24 Iss. 1 (2018) p. 1 - 15 ISSN: 1029-3531; 2415-7503 Available at: http://works.bepress.com/martin-bohner/175/