Matches in UGent Biblio for { <https://biblio.ugent.be/publication/5808532#aggregation> ?p ?o. }
Showing items 1 to 31 of
31
with 100 items per page.
- aggregation classification "P1".
- aggregation creator person.
- aggregation creator person.
- aggregation date "2014".
- aggregation format "application/pdf".
- aggregation hasFormat 5808532.bibtex.
- aggregation hasFormat 5808532.csv.
- aggregation hasFormat 5808532.dc.
- aggregation hasFormat 5808532.didl.
- aggregation hasFormat 5808532.doc.
- aggregation hasFormat 5808532.json.
- aggregation hasFormat 5808532.mets.
- aggregation hasFormat 5808532.mods.
- aggregation hasFormat 5808532.rdf.
- aggregation hasFormat 5808532.ris.
- aggregation hasFormat 5808532.txt.
- aggregation hasFormat 5808532.xls.
- aggregation hasFormat 5808532.yaml.
- aggregation isPartOf urn:issn:1742-6588.
- aggregation language "eng".
- aggregation publisher "IOP".
- aggregation rights "I have retained and own the full copyright for this publication".
- aggregation subject "Physics and Astronomy".
- aggregation title "Quantum oscillator models with a discrete position spectrum in the framework of Lie superalgebras".
- aggregation abstract "We present some algebraic models for the quantum oscillator based upon Lie superalgebras. The Hamiltonian, position and momentum operator are identified as elements of the Lie superalgebra, and then the emphasis is on the spectral analysis of these elements in Lie superalgebra representations. The first example is the Heisenberg-Weyl superalgebra sh(2 vertical bar 2), which is considered as a "toy model". The representation considered is the Fock representation. The position operator has a discrete spectrum in this Fock representation, and the corresponding wavefunctions are in terms of Charlier polynomials. The second example is sl(2 vertical bar 1), where we construct a class of discrete series representations explicitly. The spectral analysis of the position operator in these representations is an interesting problem, and gives rise to discrete position wavefunctions given in terms of Meixner polynomials. This model is more fundamental, since it contains the paraboson oscillator and the canonical oscillator as special cases.".
- aggregation authorList BK70246.
- aggregation volume "512".
- aggregation aggregates 5808566.
- aggregation isDescribedBy 5808532.
- aggregation similarTo 012034.
- aggregation similarTo LU-5808532.