C. Quesne
Published 2010-12-15, updated 2011-01-14Version 2
In memory of Marcos Moshinsky, who promoted the algebraic study of the harmonic oscillator, some results recently obtained on an infinite family of deformations of such a system are reviewed. This set, which was introduced by Tremblay, Turbiner, and Winternitz, consists in some Hamiltonians $H_k$ on the plane, depending on a positive real parameter $k$. Two algebraic extensions of $H_k$ are described. The first one, based on the elements of the dihedral group $D_{2k}$ and a Dunkl operator formalism, provides a convenient tool to prove the superintegrability of $H_k$ for odd integer $k$. The second one, employing two pairs of fermionic operators, leads to a supersymmetric extension of $H_k$ of the same kind as the familiar Freedman and Mende super-Calogero model. Some connection between both extensions is also outlined.
Comments: 10 pages, no figure; to be published in Proceedings Symmetries in Nature: Symposium in Memoriam of Marcos Moshinsky, Cuernavaca, Mexico, Aug. 9-13, 2010
Journal: Symmetries in Nature - Symposium in Memoriam of Marcos Moshinsky, AIP Conf. Proc., Vol. 1323, Amer. Inst. Phys., Melville, NY, 2010, 275-282
MHD alpha^2-dynamo, Squire equation and PT-symmetric interpolation between square well and harmonic oscillator
Supersymmetric partners of the harmonic oscillator with an infinite potential barrier
Poincaré disk as a model of squeezed states of a harmonic oscillator
![QR code for arXiv:1012.3357 [math-ph]](http://oss.arxitics.com/images/favicon.svg)