Weakly ordered partial commutative group of self-adjoint linear operators densely defined on Hilbert space

Media type: E-Article
Title: Weakly ordered partial commutative group of self-adjoint linear operators densely defined on Hilbert space
Contributor: Janda, Jiří
imprint: Walter de Gruyter GmbH, 2011
Published in: Tatra Mountains Mathematical Publications
Language: Not determined
DOI: 10.2478/v10127-011-0037-x
ISSN: 1210-3195
Keywords: General Mathematics
Origination:
Footnote:
Description: <jats:title>ABSTRACT</jats:title> <jats:p> We continue in a direction of describing an algebraic structure of linear operators on infinite-dimensional complex Hilbert space ℋ. In [Paseka, J.- -Janda, J.: More on PT-symmetry in (generalized) effect algebras and partial groups, Acta Polytech. 51 (2011), 65-72] there is introduced the notion of a weakly ordered partial commutative group and showed that linear operators on H with restricted addition possess this structure. In our work, we are investigating the set of self-adjoint linear operators on H showing that with more restricted addition it also has the structure of a weakly ordered partial commutative group.</jats:p>
Access State: Open Access

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