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BEYOND UNITARY PARASUPERSYMMETRY FROM THE VIEWPOINT OF h₃ AND h₄ HEISENBERG ALGEBRAS

A. CHENAGHLOU

Physics Department, Faculty of Science, Sahand University of Technology, P. O. Box 51335-1996, Tabriz, Iran

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and

H. FAKHRI

Institute for Studies in Theoretical Physics and Mathematics (IPM), P. O. Box 19395-5531, Tehran, Iran

Department of Theoretical Physics and Astrophysics, Physics Faculty, Tabriz University, P. O. Box 51664, Tabriz, Iran

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https://doi.org/10.1142/S0217732306020597Cited by:1 (Source: Crossref)

Abstract

Using the partition of the number p-1 into p-1 real parts which are not equal with each other necessarily, we develop the unitary parasupersymmetry algebra of arbitrary order p so that the well-known Rubakov–Spiridonov–Khare parasupersymmetry becomes a special case of the developed one. It is shown that the developed algebra is realized by simple harmonic oscillator and Landau problem on a flat surface with the symmetries of h₃ and h₄ Heisenberg–Lie algebras. For this new parasupersymmetry, the well-known unitary condition is violated, however, unitarity of the corresponding algebra is structurally conserved. Moreover, the components of the bosonic Hamiltonian operator are derived as functions from the mean value of the partition numbers with their label weight function.

Keywords:

PACS: 02.20.-a, 02.20.Sv, 03.65.Fd, 03.65.Ge, 12.39.St

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