A semi-inverse variational method for generating the bound state energy eigenvalues in a quantum system: The Schrödinger equation

Exact solutions of Schrödinger equation are obtained for the modified Kratzer and the corrected Morse potentials with the position-dependent effective mass. The bound state energy eigenvalues and the corresponding eigenfunctions are calculated for any angular momentum for target potentials. Various forms of point canonical transformations are applied.

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Analytical solutions of fractional Schrödinger equation and thermal properties of Morse potential for some diatomic molecules

Modern Physics Letters A ◽

10.1142/s0217732321500413 ◽

2021 ◽

pp. 2150041

Author(s):

U. S. Okorie ◽

A. N. Ikot ◽

G. J. Rampho ◽

P. O. Amadi ◽

Hewa Y. Abdullah

Keyword(s):

Schrödinger Equation ◽

Schrodinger Equation ◽

Morse Potential ◽

State Energy ◽

Diatomic Molecules ◽

Bound State ◽

Bound State Energy ◽

Fractional Schrödinger Equation ◽

Energy Eigenvalues ◽

Fractional Schrodinger Equation

By employing the concept of conformable fractional Nikiforov–Uvarov (NU) method, we solved the fractional Schrödinger equation with the Morse potential in one dimension. The analytical expressions of the bound state energy eigenvalues and eigenfunctions for the Morse potential were obtained. Numerical results for the energies of Morse potential for the selected diatomic molecules were computed for different fractional parameters chosen arbitrarily. Also, the graphical variation of the bound state energy eigenvalues of the Morse potential for hydrogen dimer with vibrational quantum number and the range of the potential were discussed, with regards to the selected fractional parameters. The vibrational partition function and other thermodynamic properties such as vibrational internal energy, vibrational free energy, vibrational entropy and vibrational specific heat capacity were evaluated in terms of temperature. Our results are new and have not been reported in any literature before.

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ACCURATE ITERATIVE AND PERTURBATIVE SOLUTIONS OF THE YUKAWA POTENTIAL

International Journal of Modern Physics E ◽

10.1142/s0218301306004806 ◽

2006 ◽

Vol 15 (06) ◽

pp. 1253-1262 ◽

Cited By ~ 18

Author(s):

M. KARAKOC ◽

I. BOZTOSUN

Keyword(s):

Numerical Methods ◽

Schrödinger Equation ◽

Schrodinger Equation ◽

State Energy ◽

Yukawa Potential ◽

Bound State ◽

Asymptotic Iteration Method ◽

Bound State Energy ◽

Energy Eigenvalues ◽

Radial Schrödinger Equation

We apply the asymptotic iteration method to solve the radial Schrödinger equation for the Yukawa type potentials. The solution of the radial Schrödinger equation by using different approaches requires tedious and cumbersome calculations; however, we present that it is possible to obtain the bound state energy eigenvalues for any n and ℓ values easily within the framework of this method. We also show the perturbed application of this method for the same potential. Our results are in excellent agreement with the findings of the SUSY perturbation, 1/N expansion and numerical methods.

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A semi-inverse variational method for generating the bound state energy eigenvalues in a quantum system: the Dirac Coulomb type-equation

Journal of Modern Optics ◽

10.1080/09500340.2017.1417509 ◽

2017 ◽

Vol 65 (8) ◽

pp. 987-993 ◽

Cited By ~ 5

Author(s):

K. Libarir ◽

A. Zerarka

Keyword(s):

Variational Method ◽

Quantum System ◽

State Energy ◽

Type Equation ◽

Bound State ◽

Bound State Energy ◽

Energy Eigenvalues ◽

Coulomb Type

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ANALYTICAL SOLUTIONS OF THE SCHRÖDINGER EQUATION WITH THE WOODS–SAXON POTENTIAL FOR ARBITRARY l STATE

International Journal of Modern Physics E ◽

10.1142/s0218301309012756 ◽

2009 ◽

Vol 18 (03) ◽

pp. 631-641 ◽

Cited By ~ 41

Author(s):

V. H. BADALOV ◽

H. I. AHMADOV ◽

A. I. AHMADOV

Keyword(s):

Schrödinger Equation ◽

Schrodinger Equation ◽

State Energy ◽

Bound State ◽

Saxon Potential ◽

Energy Eigenvalues ◽

Quantum Numbers ◽

Radial Schrödinger Equation ◽

Uvarov Method ◽

Pekeris Approximation

In this work, the analytical solution of the radial Schrödinger equation for the Woods–Saxon potential is presented. In our calculations, we have applied the Nikiforov–Uvarov method by using the Pekeris approximation to the centrifugal potential for arbitrary l states. The bound state energy eigenvalues and corresponding eigenfunctions are obtained for various values of n and l quantum numbers.

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Arbitrary l-state solutions of the Schrödinger equation for the Eckart potential with an improved approximation of the centrifugal term

Open Physics ◽

10.2478/s11534-011-0071-y ◽

2011 ◽

Vol 9 (6) ◽

Cited By ~ 4

Author(s):

Jerzy Stanek

Keyword(s):

Schrödinger Equation ◽

Schrodinger Equation ◽

State Energy ◽

Bound State ◽

Centrifugal Term ◽

Energy Eigenvalues ◽

Eckart Potential ◽

Quantum Numbers ◽

Approximate Analytical Solutions ◽

Screening Parameter

AbstractApplying an improved approximation scheme to the centrifugal term, the approximate analytical solutions of the Schrödinger equation for the Eckart potential are presented. Bound state energy eigenvalues and the corresponding eigenfunctions are obtained in closed forms for the arbitrary radial and angular momentum quantum numbers, and different values of the screening parameter. The results are compared with those obtained by the other approximate and numerical methods. It is shown that the present method is systematic, more efficient and accurate.

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Solutions of Schrodinger equation and thermodynamic properties of Iodine and Scandium Fluoride molecules based on Formula method

Physica Scripta ◽

10.1088/1402-4896/ac4717 ◽

2021 ◽

Author(s):

Ifeanyi Jude Njoku ◽

Chibueze Paul Onyenegecha ◽

Chioma J Okereke ◽

Ekwevugbe Omugbe ◽

Emeka Onyeocha

Keyword(s):

Partition Function ◽

Thermodynamic Properties ◽

Schrödinger Equation ◽

Schrodinger Equation ◽

State Energy ◽

Bound State ◽

Energy Solution ◽

Bound State Energy ◽

Radial Schrödinger Equation ◽

Formula Method

Abstract The study presents the thermodynamic properties of the Iodine and Scandium Flouride molecules with molecular Deng-Fan potential. The bound state energy solution of the radial Schrodinger equation is obtained via the formula method. The partition function and other thermodynamic properties are evaluated via the Poisson summation approach. The numerical values of energy of the I2 and ScF molecules are found to be in agreement with results obtained from other methods in the literature. The results further show that the partition function decreases, and then converges to a constant value as temperature increases.

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Solutions of Schrodinger Equation And Thermodynamic Properties of Potassium Dimer Based On Formular Method

10.21203/rs.3.rs-763444/v1 ◽

2021 ◽

Author(s):

C. P. Onyenegecha ◽

E. N. Omoko ◽

I. J. Njoku ◽

E. E. Oguzie ◽

C. J. Okereke

Keyword(s):

Partition Function ◽

Thermodynamic Properties ◽

Schrödinger Equation ◽

Schrodinger Equation ◽

State Energy ◽

Bound State ◽

Bound State Energy ◽

Radial Schrödinger Equation ◽

Potassium Dimer ◽

Formula Method

Abstract The study presents the thermodynamic properties of the XI Σ+g state of potassium (K2) dimer with molecular Deng-Fan potential. The bound state energy solution of the radial Schrodinger equation is obtained via the formula method. The partition function and other thermodynamic properties are evaluated. The numerical values of energy are found to be in agreement with results obtained from other methods in literature. The results further show that the partition function increases as temperature decreases, which implies a decrease in the probability of finding a particle in a state with quantum number, n.

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Effect of the velocity-dependent potentials on the energy eigenvalues of the Morse potential

Open Physics ◽

10.2478/s11534-012-0018-y ◽

2012 ◽

Vol 10 (4) ◽

Cited By ~ 7

Author(s):

Asim Soylu ◽

Orhan Bayrak ◽

Ismail Boztosun

Keyword(s):

Morse Potential ◽

State Energy ◽

Bound State ◽

Quantum States ◽

Bound State Energy ◽

Energy Eigenvalues ◽

Dependent Term ◽

Oscillator Type ◽

Dependent Potential ◽

Pekeris Approximation

AbstractWe investigate the effect of the isotropic velocity-dependent potentials on the bound state energy eigenvalues of the Morse potential for any quantum states. When the velocity-dependent term is used as a constant parameter, ρ(r) = ρ 0, the energy eigenvalues can be obtained analytically by using the Pekeris approximation. When the velocity-dependent term is considered as an harmonic oscillator type, ρ(r) = ρ 0 r 2, we show how to obtain the energy eigenvalues of the Morse potential without any approximation for any n and ℓ quantum states by using numerical calculations. The calculations have been performed for different energy eigenvalues and different numerical values of ρ 0, in order to show the contribution of the velocity-dependent potential on the energy eigenvalues of the Morse potential.

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The bound state solutions of the D-dimensional Schrödinger equation for the Woods–Saxon potential

International Journal of Modern Physics E ◽

10.1142/s0218301316500026 ◽

2016 ◽

Vol 25 (01) ◽

pp. 1650002 ◽

Cited By ~ 7

Author(s):

V. H. Badalov

Keyword(s):

Schrödinger Equation ◽

Schrodinger Equation ◽

Bound State ◽

Wave Functions ◽

Saxon Potential ◽

Radial Wave ◽

Energy Eigenvalues ◽

Quantum Numbers ◽

Radial Schrödinger Equation ◽

Pekeris Approximation

In this work, the analytical solutions of the [Formula: see text]-dimensional radial Schrödinger equation are studied in great detail for the Wood–Saxon potential by taking advantage of the Pekeris approximation. Within a novel improved scheme to surmount centrifugal term, the energy eigenvalues and corresponding radial wave functions are found for any angular momentum case within the context of the Nikiforov–Uvarov (NU) and Supersymmetric quantum mechanics (SUSYQM) methods. In this way, based on these methods, the same expressions are obtained for the energy eigenvalues, and the expression of radial wave functions transformed each other is demonstrated. In addition, a finite number energy spectrum depending on the depth of the potential [Formula: see text], the radial [Formula: see text] and orbital [Formula: see text] quantum numbers and parameters [Formula: see text] are defined as well.

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