Latent Complete-Lattice Structure of Hilbert-Space Projectors
To uncover the hidden complete-lattice structure of Hilbert-space projectors, which is not seen by the operator operations and relations (algebraically), resort is taken to the ranges of projectors (to subspaces—to geometry). Taking the range of a projector is completed into a bijection of all proj...
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Quanta
2019-03-01
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| Series: | Quanta |
| Online Access: | https://dankogeorgiev.com/ojs/index.php/quanta/article/view/44 |
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| author | Fedor Herbut |
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| author_sort | Fedor Herbut |
| collection | DOAJ |
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To uncover the hidden complete-lattice structure of Hilbert-space projectors, which is not seen by the operator operations and relations (algebraically), resort is taken to the ranges of projectors (to subspaces—to geometry). Taking the range of a projector is completed into a bijection of all projectors onto all subspaces of any finite or countably infinite dimensional Hilbert space. As a second step, this basic bijection is upgraded into an isomorphism of partially ordered sets utilizing the sub-projector relation on the one hand, and the subspace relation on the other. As a third and final step, the basic bijection is further upgraded to isomorphism of complete lattices. The complete-lattice structure is derived for subspaces, then, using the basic bijection, it is transferred to the set of all projectors. Some consequences in the quantum-mechanical formalism are examined with particular attention to the infinite sums appearing in spectral decompositions of discrete self-adjoint operators with infinite spectra.
Quanta 2019; 8: 1–10.
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| format | Article |
| id | doaj-art-eea705b6811f48b8bd3c7826fb7960db |
| institution | DOAJ |
| issn | 1314-7374 |
| language | English |
| publishDate | 2019-03-01 |
| publisher | Quanta |
| record_format | Article |
| series | Quanta |
| spelling | doaj-art-eea705b6811f48b8bd3c7826fb7960db2025-08-20T03:22:57ZengQuantaQuanta1314-73742019-03-01810.12743/quanta.v8i1.8544Latent Complete-Lattice Structure of Hilbert-Space ProjectorsFedor Herbut0Serbian Academy of Sciences and Arts To uncover the hidden complete-lattice structure of Hilbert-space projectors, which is not seen by the operator operations and relations (algebraically), resort is taken to the ranges of projectors (to subspaces—to geometry). Taking the range of a projector is completed into a bijection of all projectors onto all subspaces of any finite or countably infinite dimensional Hilbert space. As a second step, this basic bijection is upgraded into an isomorphism of partially ordered sets utilizing the sub-projector relation on the one hand, and the subspace relation on the other. As a third and final step, the basic bijection is further upgraded to isomorphism of complete lattices. The complete-lattice structure is derived for subspaces, then, using the basic bijection, it is transferred to the set of all projectors. Some consequences in the quantum-mechanical formalism are examined with particular attention to the infinite sums appearing in spectral decompositions of discrete self-adjoint operators with infinite spectra. Quanta 2019; 8: 1–10. https://dankogeorgiev.com/ojs/index.php/quanta/article/view/44 |
| spellingShingle | Fedor Herbut Latent Complete-Lattice Structure of Hilbert-Space Projectors Quanta |
| title | Latent Complete-Lattice Structure of Hilbert-Space Projectors |
| title_full | Latent Complete-Lattice Structure of Hilbert-Space Projectors |
| title_fullStr | Latent Complete-Lattice Structure of Hilbert-Space Projectors |
| title_full_unstemmed | Latent Complete-Lattice Structure of Hilbert-Space Projectors |
| title_short | Latent Complete-Lattice Structure of Hilbert-Space Projectors |
| title_sort | latent complete lattice structure of hilbert space projectors |
| url | https://dankogeorgiev.com/ojs/index.php/quanta/article/view/44 |
| work_keys_str_mv | AT fedorherbut latentcompletelatticestructureofhilbertspaceprojectors |