# Entropic functionals of Laguerre and Gegenbauer polynomials with large   parameters

**Authors:** N. M. Temme, I. V. Toranzo, J. S. Dehesa

arXiv: 1705.03627 · 2017-05-24

## TL;DR

This paper investigates the asymptotic behavior of entropy-related integral functionals of Laguerre and Gegenbauer polynomials with large parameters, which are crucial for understanding quantum entropies in high-dimensional systems.

## Contribution

It provides new asymptotic formulas for entropy functionals of these polynomials as their parameters grow large, relevant for quantum physics applications.

## Key findings

- Derived asymptotic expressions for Laguerre polynomial functionals
- Derived asymptotic expressions for Gegenbauer polynomial functionals
- Enhanced understanding of quantum entropies in high-dimensional systems

## Abstract

The determination of the physical entropies (R\'enyi, Shannon, Tsallis) of high-dimensional quantum systems subject to a central potential requires the knowledge of the asymptotics of some power and logarithmic integral functionals of the hypergeometric orthogonal polynomials which control the wavefunctions of the stationary states. For the $D$-dimensional hydrogenic and oscillator-like systems, the wavefunctions of the corresponding bound states are controlled by the Laguerre ($\mathcal{L}_{m}^{(\alpha)}(x)$) and Gegenbauer ($\mathcal{C}^{(\alpha)}_{m}(x)$) polynomials in both position and momentum spaces, where the parameter $\alpha$ linearly depends on $D$. In this work we study the asymptotic behavior as $\alpha \to \infty$ of the associated entropy-like integral functionals of these two families of hypergeometric polynomials.

## Full text

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## References

32 references — full list in the complete paper: https://tomesphere.com/paper/1705.03627/full.md

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Source: https://tomesphere.com/paper/1705.03627