# A set of nonlinear coherent states for the pseudoharmonic oscillator

**Authors:** Khalid Ahbli, Hamidou Kassogue, Patrick K. Kayupe, Abdelhak Kouraich

arXiv: 1907.08881 · 2019-07-23

## TL;DR

This paper introduces a new two-parameter family of nonlinear coherent states for the pseudoharmonic oscillator, generalizing existing states and providing a Bargmann-type transform with verified normalization and resolution of identity.

## Contribution

It constructs a novel two-parameter family of nonlinear coherent states for the pseudoharmonic oscillator, extending known states and establishing their mathematical properties.

## Key findings

- Normalized and complete family of states constructed
- Generalization of Barut-Girardello and philophase states achieved
- Bargmann-type transform derived for the new states

## Abstract

We construct two-parameters family of nonlinear coherent states by replacing the factorial in coefficients $z^n/\sqrt{n!}$ of the canonical coherent states by a specific generalized factorial $x_n^{\gamma,\sigma}!$ where parameters $\gamma$ and $\sigma$ satisfy some conditions for which the normalization condition and the resolution of identity are verified. The obtained family is a generalization of the Barut-Girardello coherent states and those of the philophase states. In the particular case of parameters $\gamma$ and $\sigma$, we attache these states to the pseudo-harmonic oscillator depending on two parameters $\alpha,\beta> 0$. The obtained nonlinear coherent states are superposition of eigenstates of this oscillator. The associated Bargmann-type transform is defined and we derive some results.

## Full text

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## References

27 references — full list in the complete paper: https://tomesphere.com/paper/1907.08881/full.md

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Source: https://tomesphere.com/paper/1907.08881