Litcius/Paper detail

Bound state solutions, Fisher information measures, expectation values, and transmission coefficient of the Varshni potential

E. Omugbe, O. E. Osafile, I. B. Okon, Edison A. Enaibe, M. C. Onyeaju

2021Molecular Physics22 citationsDOI

Abstract

The eigensolutions of the Schrödinger equation under the Varshni potential function are studied with two eigensolution techniques such as the Nikiforov–Uvarov and the semi-classical WKB approximation methods. We extended the work to investigate the analytical and numerical Fisher information measure of complexities and also the expectations values using the Hellmann–Feynman theorem. We determined the transmission coefficient using the WKB method. The WKB energy levels and mean values fluctuate with the potential range compared with the NU derived values. Our results for the Fisher information measure obey the uncertainty relation I(ρ)I(γ)≥36 and the Cramer–Rao inequality for position space (I(ρ)⟨r2⟩≥9). The mean values conform to the ones reported in existing literature.

Topics & Concepts

WKB approximationMeasure (data warehouse)Fisher informationMathematicsTransmission coefficientWork (physics)Quantum mechanicsRange (aeronautics)Function (biology)PhysicsMathematical analysisStatistical physicsStatisticsMathematical physicsTransmission (telecommunications)Electrical engineeringEngineeringMaterials scienceDatabaseComputer scienceEvolutionary biologyBiologyComposite materialQuantum Mechanics and Non-Hermitian PhysicsQuantum Information and CryptographyQuantum chaos and dynamical systems