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  5. Information entropies with Varshni-Hellmann potential in higher dimensions
 
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Information entropies with Varshni-Hellmann potential in higher dimensions

Journal
Physics Open
ISSN
2666-0326
Date Issued
2024-08
Author(s)
Etido P. Inyang
National Open University of Nigeria
A.E.L. Aouami
Mohammed V University in Rabat, Morocco
Norshamsuri Ali @ Hasim
Universiti Malaysia Perlis
Rosdisham Endut
Universiti Malaysia Perlis
N.R. Ali
Universiti Sains Malaysia
Syed Alwee Aljunid Syed Junid
Universiti Malaysia Perlis
DOI
10.1016/j.physo.2024.100220
Handle (URI)
https://www.sciencedirect.com/science/article/pii/S2666032624000188
https://www.sciencedirect.com/journal/physics-open
https://hdl.handle.net/20.500.14170/16305
Abstract
This work investigates the behavior of Shannon entropy and Fisher information for the Varshni-Hellmann potential (VHP) in one and three dimensions using the Nikiforov-Uvarov method. We employ the Greene-Aldrich approximation scheme to obtain the energy eigenvalues and normalized wavefunctions, which are then used to calculate these information-theoretic quantities. Our analysis revealed remarkably similar high-order features in both position and momentum spaces. Notably, our calculations showed enhanced accuracy in predicting particle localization within position space. Furthermore, the combined position and momentum entropies obeyed the lower and upper bounds established by the Berkner-Bialynicki-Birula-Mycieslki inequality. Additionally, for three-dimensional systems, the Stam-Cramer-Rao inequalities were fulfilled for different eigenstates with respect to the calculated Fisher information. It is observed that as the position Fisher entropy decreases, indicating a more precise measurement of position, the momentum Fisher entropy must increase. This implies that the Fisher information regarding momentum decreases, resulting in a decrease in the precision of momentum measurement. This demonstrates how position and momentum uncertainties complement each other in quantum mechanics. Exploring the balance between position and momentum Fisher entropy reveals a fundamental aspect of the uncertainty principle in quantum mechanics, highlighting the restrictions on measuring certain pairs of conjugate variables simultaneously with high precision.
Subjects
  • Fisher information

  • Nikiforov-uvarov meth...

  • Schrödinger equation

  • Shannon entropy

  • Stam-cramer-rao inequ...

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Information entropies with Varshni-Hellmann potential in higher dimensions.pdf (83.39 KB) Information entropies with Varshni-Hellmann potential in higher dimensions.pdf (2.1 MB)
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