The canonical Kravchuk basis for discrete quantum mechanics

Tuǧrul Hakioǧlu; Kurt Bernardo Wolf

doi:10.1088/0305-4470/33/16/318

The canonical Kravchuk basis for discrete quantum mechanics

Tuǧrul Hakioǧlu^*, Kurt Bernardo Wolf

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

19 Citations (Scopus)

Abstract

The well known Kravchuk formalism of the harmonic oscillator obtained from the direct discretization method is shown to be a new way of formulating discrete quantum phase space. It is shown that the Kravchuk oscillator Hamiltonian has a well defined unitary canonical partner which we identify with the quantum phase of the Kravchuk oscillator. The generalized discrete Wigner function formalism based on the action and angle variables is applied to the Kravchuk oscillator and its continuous limit is examined.

Original language	English
Pages (from-to)	3313-3323
Number of pages	11
Journal	Journal of Physics A: Mathematical and General
Volume	33
Issue number	16
DOIs	https://doi.org/10.1088/0305-4470/33/16/318
Publication status	Published - 28 Apr 2000
Externally published	Yes

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AB - The well known Kravchuk formalism of the harmonic oscillator obtained from the direct discretization method is shown to be a new way of formulating discrete quantum phase space. It is shown that the Kravchuk oscillator Hamiltonian has a well defined unitary canonical partner which we identify with the quantum phase of the Kravchuk oscillator. The generalized discrete Wigner function formalism based on the action and angle variables is applied to the Kravchuk oscillator and its continuous limit is examined.

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The canonical Kravchuk basis for discrete quantum mechanics

Abstract

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