# Comment on "Hybrid deformed algebra", by Andre A. Marinho, Francisco A.   Brito [arXiv:1904.07843]

**Authors:** Johar M. Ashfaque

arXiv: 1906.03071 · 2019-06-10

## TL;DR

This paper critiques a previous claim by clarifying that the $-oscillator does not generate Fibonacci sequences in the limit $ ightarrow 0$, and discusses conditions under which Fibonacci sequences emerge from $q$-deformations.

## Contribution

It corrects a misconception about the $$-oscillator's relation to Fibonacci sequences and clarifies the conditions for Fibonacci sequence emergence in $q$-deformed systems.

## Key findings

- The $$-oscillator does not produce Fibonacci sequences as previously claimed.
- Fibonacci sequences appear only when $q$-deformation is combined with $$-deformation.
- The sequence reduces to standard integers in the limit $ ightarrow 0$.

## Abstract

In this note, we show that the $\mu$-oscillator does not lead to the Fibonacci sequence as claimed in \cite{Marinho:2019zny} since $[n]^{\mu}=n$ in the limit $\mu \rightarrow 0$. Thus we obtain the sequence $[0]^{\mu}=0, 1, 2,...$. We only obtain the Fibonacci sequence when the $q$-deformation is associated to the $\mu$-deformation via the basis number $$\lim_{\mu\rightarrow 0} [n]^{\mu}_{q_1, q_2} = \frac{q_1^{2n}-q_2^{2n}}{q_1^2-q_2^2}.$$

## Full text

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## References

1 references — full list in the complete paper: https://tomesphere.com/paper/1906.03071/full.md

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Source: https://tomesphere.com/paper/1906.03071